- No category
Rozkłady częstości: Przedziały klasowe i granice
advertisement
CL L \ -
apt er
s e c 2@ e f r e q u e n
PT9
W
C o n st r u c t in
_
1
w
.
o f item s b elo n in
ch c l a ss
g
g to ea
g a g r o u p ed f r eq u en c
y
co n str u ct in
f r eq u en cy
d ist r ib u t i o n
f o r n u m e r i c a l d a t a f o l low s
.
D e t e r m i n e ih e c l a s s
es
b)
Fin d t h e r a n
c)
S e le c t th e n u m b er
o f c lasses d esired
d)
Fin d
ge :
R
o w e st v a lu e
h i gh e s t v a l u e
=
th e c lass in t e r v a l
(
w i d th :
)
S elec t a sta rtin
v alu e
g
p o in t
(u su ally
p er l im its
.
b etw een
c la ss in t er v a l
5 an d 2 0
(w i d t h )
=
)
.
R / no
.
o
f c l a ss e s Then
.
ro und th e
.
(u s u a l l y t h e l o w e s t v a l u e o r a n y c o n v e n i e n t n u m b e r l e s s i h a n t h e 1o w e s t
) ; ad d th e w id th to
Fin d t h e u p
.
lo w e s t v a l u e
-
an sw e r u
p to th e n ear e st w h o le n u m b er
f)
.
d ist r ib u tio n
g a g r o u p ed
F in d t h e h i g h e s t v a l u e a n d l
e)
.
_
)
a
i ?< <
¥ ++.
0
g a lso t h e n -
T he p r o ced u r e fo r
Ste p
t D a ta
gng d i s t r i b u t i o n i s a t a b l e t h a t d i v i d e s a s e t o f d a t a i n t o a s u i t a b l e n u m D e r
1i
o f classes sh o
w in
fi
o
41
.
-
2 Tr e ae nt
g et th e lo w er lim its
.
.
St e p 2
T a lly th e d ata
St e p 3
F in d th e n u m eric al f re
.
q u en cies fro m
th e ta l li e s
.
»
1T
1 LH
W
˘-
10
•
3G
r U
gz
D4
1 3
_
-
-
\B
5 1
s q
s 1i
10
キ
\n "
20
L ow e r C la ss L i m it s
(L C L )
<
-
-
27
28
-
35
36
-
43
44
-
51
c
a s
q
• V
. Q e n
U pp er C l a s s L i m i t s
L)
Scanned(U Cby
CamScanner
S
N o te t h a t t h e c la ss li m it s a r e g iv e n
˘
to a s m a n y
d ec im a l p la c es a s t h e o r ig in a l d a t a .
Fo r ex a m p le
I
f
q 6
the
i g
na l
i
sknd
a
1
or
0f
th e
da t a
12
o r i g in a l
12
ha d
19
-
d a ta
be e n
2
20
,
h a d
t o
27 9
,
28
i v e n
t o
2
.
g
27 99
-
.
.
1 -
ac e ,
l
ve n
i
-
b e e n
19 9 9 , 20
-
g
.
d e c i m
.
,
a l
3 5 99
28
,
35 9
-
p
,
36
-
u
43 9
,
.
la c e s ,
36
wo
we
w
e
w
44
o
4 3 99
-
d ha v e
l
.
52
,
-
59 9
.
ld h a v e u s e d t h e c l a s s l i m i t s
u
5 1 99
-
4 4
,
.
51 9
-
t s.
cl as s l i mi
t he
us e d
.
52
,
.
59 9 9
-
.
C l a s s B o u n d a Ie [
•
.
T he c l a s s b o u n d a r i e s a r e t h e e n d p o i n t s o f t h e i n t e r v a l s t h a t sp e c i f y
d i str i b u ti o n
a r e u se d t o se p a r a te th e c la sse s so th a t t h e r e a r e n o g ap s i n th e fr e q u en c y
Ex
.w
l
m
e o Jr e
w
s
C
B
.
f
C lass B o u n d a r ies
C la ss L i m i t s
羽 国 12 19 飞
。 叮
-
29
-
28
\
旧
一
27
\q S
35
2B S
36
43
3 5
44
-
51
13
52
3
S
5 \ 9
•
-
5
-
-
s + S
59
-
•
•
-
S
.
2< [
-
•
ら
•
职
.
-
-
.
en?+ g Lv S
W
T
回 国
th e se en d p o i n ts
c las s an d
each
W
-
-
•
9
L ow er
C l a ss B o u n d a r y
(L C B ) L F w e r C l a s s L i m i t ( L C L )
Upper
C la ss B o u n d a r y
w CB)
=
N o t e t h a t t h e c l a s s b o u n d a Ui / s i r e g i v
=
0 5
-
.
U pp e r C l a s s L i m i t ( U L L ) + 0 5
.
.
n to as m
ii n y d e c i m a l p l a c e s a s t h e o r i g i n a l
a ta
.
Fo r ex a m p l e
b
I
f
th e
oD g
i
da t a
na l
ha d
•
ee n
to 1 i
gi ve n
eci mal pl ac e ,
LOWer ass B o u n d a r y ( L C B )
Boun d ary
Upp
(U C B )
=
=
w
e
wo
u l
d ha v e
cl as s bo u n d a r i es .
t he
us e d
LC L
L o w e r C l a s s L i m i t (L C L ) 0 0 5
U p p e r c l a s s L i m i t (U L L ) + 0 0 5
-
.
.
,
.
’
be vleen
\ b
o ˘
g
P
1 0
.
t h e
I f
o r i
bo u n d a r i e s
e
.
g
i n a l
g
•
b
T
o
l
q S
j
27 L
-
b e e n
l\
_
1 QS
.
.
h a d
d a t a
•
.
22
u
15 9
-
-
•
b
o
.
o
s
C la ss B o u n d a r ies
C l a ss L im it s
d i\ { er Qn ( A
.
-
1d r
e g
\
1:
i v e n
g
t o
2
d e c i m
a l
p
l a c e s ,
w
e
.
2 1 Q5
.
_
w
QS
o
u
ld ha v e
u se d
th e
c lass
.
L ow er C lass B o u n d a ry
=
(L C B )
Up per C la ss B o u n d a r y
(U C B
)
=
L ow er C la ss L im it (L C 1 )
0 005
U p p e r C l a s s L i m i t (U L L ) + 0 0 05
-
.
.
.
三
ゴ
竺
三
드
蓑
藜
三
0
-
15
.
r
0
-
c
o
s
q
\
-
q q s
L1
团
-
包
二
2 1
.
c
\q s
21
习 qqs
.
Scanned by CamScanner
L(
˘
˙ b _ ?i / b f m
b
.
p
【1a r i
s_ b o w
•
C b
>
-
_
e
_
L C
A
c B
cj
L ow er
C la ss L im i t
U P Pe r
C lass L im it U C L =
(
)
(L C L )
-
(L C B ) + 0 5
U p p e r C l a s s B o u n d a r y (U L B ) 0 5
L o w er C lass B o u n d a ry
=
.
-
.
C la s s B n u n d a r ie s
b)
C la ss U o u n t l a r ic s
o
C la ss L im it s
11
_
\q
-
. o
q
q J J
I
C ][n s s I n t e r v a l
t
b \ h)
( C t
TG
. ’
,
-
a
’
C la s s in te r v a l i s t h e w id t h o l t h e c la ss l i
C la s s i n t e r v a l
=
s
u
bt r a c t
th e
l o w c l. o r
(
m its
u p
c lass l im it
o f
o n e c lass fr om
th e
lo w er
(
c la ss lim it o f th e n ex t c la s s
or
u pper)
Or
C la ss in t e r v a l
=
d iffe r e n c e b e t w e ( n a n y s u c c e s s i v e c l a s s b o u n d a ri e s
( 4 \x ed l
.
-
L
w
m
a )
=
C lass in ter v al
1
’
rg \
\0
Cla ss L im its
0
,,
b)
C la s s i n t e r v a l
=
9
-
l
8
C la ss B o u n d a r i es
19 5
-
.
27 5
.
_ »o
C
l a
_
M k
,
27 5
.
-
35 5
.
CH
T he c l a s s m ar k s i s t h e m i d p o i n t o f t h e c l a s s l i m i t s ( c l a s s b o u n d a r i e s)
.
L CB + U C B
c la ss m ar k s
o r
-
c l ass m ar k s -
2
2
Class M a r k s m
1
5
10
IS
25
-
9
-
14
J
-
1y
W
-
29
W
’
.
Nu i t
:I u
t h a t t h e c la ss i 1 1 1c r v u l
b c
i
u
u
n
d fr om
J c
.
1
ˇ
S
W
a l
t h e c la ss m a r k s
d +
(
•
9
W
RDe k
.
per)
1
1 2
1
.
Scanned by CamScanner
s
˙ l a s s boundad_l r pm t 11 c
c
.
.
! s sar ks
C las s b o u n d a r i e s -
la s s m a r k s
c
<
(c lass in te r v a l
2
X
"
2
Ex a m p le
If th e c la ss m ar k s ar e
12
.
95 ,
a)
F in d th e c la ss in te r v a l
;
b)
F in d t h e c l a ss b o u n d a r ie s
c)
F i n d th e c la ss l im its
8 95
1
.
,
"
CF
•
95
.
)
.
1
.
-
1
C L
)
-
.
q
e o Lm t l a
e
’ Q
1 S
1
c \n s s
C E» C
l=
a r k s
24 95
l. ’
.
l6
C la s v
S
C H
C B
t
L
S
.
=
u c
.
b
c r
t
.
L C L
So l u t i o n
C lass M
.
-
4
1 5
-
1
/ la ss B o u n d a r ies
&
I
l
And
n M ,+ s
L
c la s s L i m i t s
劫
l
2 Qs )
2 2
-
21
9
-
.
11
•
95 + 3
q
q s
-
l
.
Q5
E x a m p le
Fo r t h e f o l l o w i n g c l a s s b o u n d a r i e s
C la s s B o u n d a r i e s
C la ss L im its
C l a ss M
a r k s
"
12 9 9 5
15 9 9 5
-
.
.
15 9 9 5
18 99 5
-
.
.
a
) Fin d t h e ˙ 6^
_
c)
F i n d t h e c l a s s 1i r in i t s
t
\ 2
.
qq
\8 qq
-
W
2 1 Qq
.
Zo
.
Qq
s s 4n a r k s
Fin d t h e c l
=
-
-
’
b)
r
lb
11
-
al;
.
-
旧国画画1
\3
1
.
q Qq c
.
rs
-
Scanned by CamScanner
. WOr k t m G i v e n t h e f o l l o w i n
回
g d ata
J p t n\
•
48 1
55
.
a)
’
30 2
19
.
25
C o n st r u c t a
g ro u p ed fre
b) Fin d t h e c l a s
s b o u
C)
F in d th e c l a s
s I
a
42 3
19
.
_
,
15
46
q u e n c y d istD b u tio n u si n
g
6
52
2 0 eci m
56 4
.
cl asses
n d ar ie s
ks
•
1
39
r
.
So l u t i o n
L u] e
nb
V a lu e
l
o
•
9 L )
c la s s e s
in o
1h
.
ht qhe
=
E
\ 2
l c1ses
u o ls e/
\c˘
m its
ヘ
•
8 o
s
_
一
。
W H
38 q
=v n
幻 q
나门
s
M
-
.
.
-
らマ
hou
Jd
k tt
T a l ly
叼
2 e)
_
纠
b
’
)
し\
;
G
h] e
P
.
ー
.
q
(石 日
。
l w ;\ k
F r eq u en cy
I C la s s M a r k s I C la s s B o " d " = !
旧
阳国固 I 乙 会塑
\
l
5
1 了
5
l
国团四
l\
ダ
\
11竺 譬 U 网
lliw il s 1 s
.
코
譬
•
qs
21
-
c
6
3 8 qs
.
s1 q
.
e国 引 q s
.
1 •
ー
-
一
-
-
qs
•
3 8 q
-
W
-
l
1
qs
i
L ら qs
l
5 1
_
-
,
ダ
\ t
Scanned by CamScanner
-
G iv e n t h e f o l l o w i n
g d a ta
•
.
•
20
a
26
36
48
19
15
21
29
32
42
68
35 01
.
) Co n st r u c t a g r o u p ed f r e q u en c y d i st r ib u t io n u s i n g
b) Fin d th e c la ss b o u n d a r i e s
c
)
Fin d th e c la ss m ar k s
T
6
(
t
r w
c) 1 (
4
c.
22 09
2 0 14
.
.
c la sse s
7
˘
.
So l u t i o n
Hl qhe v
h w QS
Ro
.
l
0 \u t c
c
o
Ib
=
8 8
L L )
=
\ S
(
.
c la s s e s
h o
•
=
o
*
R-
1
\
u p
c la s s e s
1
_
U
H+ し
ユ
国 1
. ..
3\
38
_
3q
5 S
ら3
-
-
Qq
.
l W
国 \\ \ \
니ら
4\
マロ 日기\ \
(
, 2
.
•
ー
WD n H
V
2 L
%
T
Q
m
回国 cl
.
.
K
。 。
ぷ
qw s
H
qn»
3 e)
’
.
l
5
3 q q q T
.
•
내그 q 呖
-
.
I
•
o
=
5
0
瓦
1
.
基
.
一
。
. 、
q 42 2 3
Qq s
-
38 q q
닥丐
一
健ら q
.
6
奉
q s l wm ~ Qq
らら 气q s 1协 晖百 耳ら q 叼
5 8
•
.
•
•
一
,
•
Scanned by CamScanner
-
-
o f
m
u en m
T he r e a r e s e v e r a l a l t e r n a t i v e f o
am o n
"
g th e se ar e th e
less t h an "
@ A c u m u l a t i v e " le ss t h an
"
(
D ist r ib
A
cum u lativ e
"
m
o
r e
t
ha n
"
,
’
o
"
r
"
less ,
m
o r e
t
in to
ha n
’
a n
w h i ch d ata so m e ti m e s g ro up ed
d
"
"
o r
m
o
r e
.
Fo r e m o s t
u la t i v e d i str i b u t i o n s
c u m
.
"
l e s s ) di s t r i b u t i o n s h o w s t h e t o t a l f r e q u e n c y o f a l l v a l u e s l e s s t h a n
o r
"
o n s
r m s o f d i st r i b u t i o n
(o r l e s s t h a n ) t h e u p p e r c l a s s b o u n d a r y o f a
˘
˜
(
"
"
o r
m
o r e
g i v e n c l a s s i n t er v a l
) di s t D b u t i o n
sh o w s
g r e a t e r t h a n (o r m o r e t h a n th e l o w e r c l a s s b o
)
u n d ary o f a
g i
.
th e
to tal
fr eq u en cy
v e n c l ass in ter v a l
of
all
v al u es
,
Fr eq u e n cy
>
pre sen t e d
g ra p h ic a lly
in
th e f o r m
B o u n d a r i es
o f o g i v e s,
he r e w e
w
4
C u m u l a t i v e r 叫 1i e n c y
Or
•
o r e tha n
’ "
L
e s s
"
t h a n
% C u m u la t iv e f r eq u en cy
Scanned by CamScanner
C la s s
v
B o u n d a r ies
:
• he f re
q
T
Pl o t t e d
u e nc y
p o l yg o n
i s a
g
f o r th e
fre
r ap h
t ha t
d i sp
l ay s
t hc
q u en c ies a t th e m id
he i g h t s o f t h
p o in ts o f th c
e
J
in ts
:
by
dn m
c lasses
,
nH
us i
Th c
1 i nr
s
1 ht 1t t s} t mc
f re q u u r c i c s
n 1
>l
l n1 i l t 1h
rc p re sc n lc
tl b y
.
r e
0
q U E n C)
% Fr e
4
q u en cy
’"
Gi v e n t h e f o l l o w i n
u en c
g
C la s s L i m i t s
I
y d i s tr i b u t i o n
Fr eq u en c
26
-
y
.
{l )
U
-qa
30
上
-
c la s s B o u n d a r i e s
.
旧
2 1目 2
J
40
To tal
a)
"
"
Ex a m p l e
36
n.
’
\
C o n s t r u c t a I 1i s t o
g r am
20
.
,
-
M arks
J,
.
H ’
三否石厂コ
19 景
j
30 S
1
•
-
3b
s
3 3
38
,
o f th e ab o
’
*
.
: :
.
:>
,
4 w e n B\
+I T
k
m t er o
Scanned by CamScanner
Scanned by CamScanner
"
d ) c o n v e r t t h e c u m u l a t i v e " .e s s t h a n " d i s t r i b u t i o n
plo t it s o g iv e ;
\.
Jc
_
-
,
u m u l a t iv e F r e
q
1
_
(C n
.
a c u m u lativ e
i n to
’
\
t M 1
i 1 \es s nn
\ \ wBs
-
\ a bo
"
d
ist r ib u t i o n a
n d
\o w t r
cy
r
’
\e s
\w
h$ 1
A s s 1 \ 气む 1
C o n v ert
o giv e
» r
3» s
l 6 5
th e
;pnw
re
o
e)
n
ha n
en
e F r eq u
u m u la t iv
,
\, s s
t
r e
o
m
l
\[
1v or eon -
l
l
l&
w-
乏ロ
ド ロ。 1 ; o n
"
d istr ib u tio n
in to
a
cu m u lativ e
m
"
ha n
t
r e
o
n
A
l
a
ac f i
四国
pe r c e n ta g e
d istr ib u t io n
and
pl
ot
it s
.
eq u en cy
p er cen t a g e C u m u la tiv e F r
C la ss L i m it s
tn
r e M
m
s
•
\ \
s
tn o r e
1
h
lo S
Mo
l i no
1s
h
. h m
2
pm
z s
Gw
m or F
’
l in e r e
M ow
m o r t
.
o
{ qin w
3
1
9
b
5
1 l oo
¸
I
•
•
5
Q b
S
•
•
S
s
。
o
o
i
I
。
1
5
r
.
.I
•
’
8
•
s
x 1. .
.
•
•
t
.
,
/
0 7
1
•
* 1c o
1i 00
•
.
•
s
•
b
•
\ o o
.
x 1o 0
-
•
o o
(% c
15
I o
•
/+
•
2 5
/
"
.
y
y
e,
:
v
.
o
.
ン
CT
Scanned by CamScanner
Se c
.
m
St e m
T he s te m
gr a p h i n g
a
n
d
n d
a
l e a f m
-
lea f d i sp l ay
-
is a m e th o d o f o rg a n iz in g d a ta an d
is a
cobi nat i on o f s o r t i n g a n d
.
Ex am p lq
¡
I f a ste m
d
a
n
le a f d i sp l a y h a s t w o
-
d ig i t s t e m
-
12
.
\
T he c o r r e s p o n d i n g d a t a a r e
fi
I f a stem
d
n
a
10 2 3 5 8
2 3 / }
2 o / 1 2 2 / 1
.
1 5 / , 1. 1 8
.
.
.
.
le a f d i sp l a y h a s t h e s t e m
-
sq
-
g
.
0 3 103 17 5 5 89
b;
-
h
.
0
W ith t w o
-
3 03
o
l
3
•
Bo
•
1
3
55 I 0
3 89
d i g i t l e a v e s , t he n t h e c o r r e s p o n d i n g d a t a a r e
-
hd
’
Con st r u ct i n g a g
St e p
e F<
1 : c h o i c e th e ste m
St e p 2 : p l a c e t h e m
d
a
n
[ OT
le a f d i s p lm i
-
e ith e r o n e
d ig i t o r t w o
-
in o rd er v e rtic a lly
fro m
’
-
hn
d igi t st e m
o b sa y d
f
he n
\o
t
<
h
\ o
)
.
la rg e st
sm a lle st to
l\ o n
,
St l 3 ; w o r k i n g l e f t t o r i g h t i n t h e d a t a s e t , p la c e t h e l e a v e s i n t h e i r c o r r e s p o n d i n g r o w
Sm ! = n e x t p u t t h e l e a v e s i n o r d e r i n e a c h r o w f r o m s m a l l e s t t o l a r g e s t
.
.
.
,
Ex am : 7
Co n str u c t a st e m
,
a
n
d
Ie a f d i s p l a y f o r t h e f o l l o w i n g d a t a
-
’
R D E Q ˙ ,r s ;
2 57
43
25
31
20
32
4
65
53
51
63
66
d
lea f d isp l a y f o r th e f o l l o w in g d a ta
8
.
,
_
22
_
4 3 ’"
,
32
19
S! Y t j o n
_
3
L
\
q
H
3
\
s o lu tion
3
j
r 5
3 3 r
1
E s rF e i w
2
L 2
2
1 2
3
Co n str u c t a ste m
;
.
a
n
-
&8
,
,
¨ e a F Lm \ <
-
.
&
c
1 r a
m
¢
\
1s
o
\ 2
\
\
1
’"
\8
I:
1 1
G q
l /
.
-
4 ba
u
a
n
ti w c
o o
j
w \
t w
q
\ h J
q
Scanned by CamScanner
l l
.
Se c
*
D es c r i p t iv e M
28
.
Fo r
Giv en
n u m e r ic a l d a t
a
set
o f
n
sa m p le M
n u m b an )
j
( on l
:
X , !X
o b ser v atio n s,
desc r i b e th e i r c e n t e r
I)
ea s u r e s
ea n
X 3"
2 ,
"
. . •
-
x
X n
!
t h er e
a r e
m a n y
w ay s
i n
w h ic h
w e
c a n
.
5
Y:
« p
*
a m
s
p l e
M
e a n
1
x
.
n
,
1= 1
n
Ex 1 e
G iv e n t h e f o l l o w i n g d a t a
5 ,
1
0 ,
So l u t i o n
?, a n d
-
F in d t h e sa m
p le m ean ?
百
n
S
Ex a m p le
T he g r a d e s o f 1 o s t u d e n t s i n a S t a t
o f t h e 10 st u d e n t s i s 7 w
,
q u iz are 7 ,
1 0
,
8, 7 5, 4 5, 8 , 9 , 6 5 , 3
.
.
d x
a n
.
If th e
.
ha t i s t h e v a l u e o f X ?
占
So l u t i o n
t -
1
1 .
2)
<o
\ b + 8
r
+ l
-
5 + 1
6 3
=
a
-
q
-
L
>
.
S
-
X
+
.
se t
jY
o f
X
-
, X
2
/ 1 ß
63 S
-
.
=
•
S
2
5
L
: w
n u m b ers
X
-
, X
’
,¢
过了
X
W
/
+ 3 t ?
5
m
Sa m p l e v a r i a n c e
If
X r
x A
:
.
:
e grad e
w
3
.
.
.
k
X
.
.
.
.
.
.
\
l
, X
2 .
X .
1
,
.
X
-
. . . . . .
X n
,
h a s
X
m e a n
ar e c al l ed t h e d ev i a t i o n s f r o m
.
.
i
.
.
E (x
.
,
d if feren c e s
t
th e
m ea n
t h e n u s e t h e a v e Fa g e o f t h e d e v i a t i o n s a s a m e a s u r e o f v a r i a t i o n i n t h e d a t a s e t
w i l l n o t d q i s i n c e Th e s u l n o f t h e d e v i a t i o n s i s a l w a y s z e r o
he
,
-
We
o
-
x f
i= 1
H e n c e . to o b t a i n t h e
’
q
’
m
o
s
t
c
m
o
m
o
n
m
e
a
s
u
r
e
o
f v ar i ati o n
,
w
e
s
qu a r e e a c h d e v i a t i o n
t
-
4
hi s
t
,
?
-
a
.
,
’
JP
5
Sa m p l e v a r i a n c e •
2
1 =
.
1
n
-
W
2
2
s in c e
5
X . .X
, X
2
m igh t
U n f o r tu n a te ly
.
,
.
h as
v
3
o b ser v a t i o n s
• • • • • .
,
th e
u n it
6n
a s
,
th e
w
e
w
sq u ar e
ill
de f i n e
r o o t
o f
th e
th e ir
st an d ar d
v a r ia n c e
in
h 9
J C / b
d ev i ati o n
o rd er
to
9 »
o f
n
h a v e
sam
o b se r v at i o n s
e
u n i t
a s
th e
.
Sa m p l e S t a n d a r d
D ev ia tio n
Ae B u m c p
Scanned by CamScanner
No te
2
5
s a m p le v a r ian ce =
i =
1
fo r m u l a t h a t d e f i n es 5
.
1
-
n
2
.
2
X ,
n
2
sa m p le v a r ian ce = 5
.
2
fo r m u la to co m
p u te 5
-
(
N •
Ex a m p le
n [ n
-
1
.
.
)
’
fo l l o w i n g d a t a
’
,
’
-
1 3 ,
,
’ , .
d
fin d
6 ,
t
he s a m p l e v a r i a n c e a n d
th e s
’
So l u t i o n
\
WI;
二
h
y
Z
J{ /
h
-
1
0
。’
2
)
1
3)
Co ef fic ien t o f V a r i a tio n
To c o m p ar e th e v ar iat i o n i n
一
厂
q
t ll
’
"
_
.
二二
万
J
^
0
>
H
h
n ( n
/ )
C
_
"
x 1
.
.
8
’
一
二苎
w
Ao
.
& ,
bbn )
s e v e r a l s e t s 6 æd a t a it i s
g en er a l l y d e s i r a b l e t o u s e a m e a s u re o f r e la ti v e
he
: " H i c h g iv es th e sta n d ar d d ev iation
V
:
c
.
ai $G
s
-
,
’
pe r c e n t a g e o f t h e m e a n
i
. e
t
.
.
. #.
..’
c q m cien t of v a r iatio n
.
,
s
-
p
.
.
V -
tan d a r d
:
d ev iati o n
1
m ean
100 %
•
Ex am p le
A
sam p le
’
or measmen
/
s a m ean o f 2 4 c m
c o Fr e s
p o n d in g sta n d ar d d e v i at i o n o f th i s sam
p le?
So l u t i o n
Z 2 r Cm
C V z
,
r
c v
,
=
a n d a c o e f f ic i en t
o f v ar ia tio n
o f 2 5 %
.
w n at is th e
1o o
,
2 S
)
2 S
=
8 .
l bo
G OO
=
M
\c o
Scanned by CamScanner
13
Scanned by CamScanner
Se c
.
w hen
qu a r M e s
v id ed
d at a set i s d i
o rd ered
an
P e r c
an d
-
m
qua
in to
rter s,
t
he r e s u l t i n g
p o i n t s a r e c a l l e d sam le
p
.
F i r s t Q u a r t i l e Qt
fi
d iv isio n
o n e f o u r th ,
T h e f i r s t q u a r t i l e , QI , i s a v a l u e t h a t h a s
an d 7 5 %
ar e a t ab o v e it s v a lu e
.
2 5%
r
o
,
f th e o b ser v a ti o n s b el o w
th e sa m p le 2 5
T h e f i r s t q u a r t i l e Q1 i s a l s o
th
•
.
酉
=
L a r g est
-
v alue
1
v a lu e
its v a lu e,
p o 25
p e r c e n t il e,
•
,
뇽; 乙
Sm a l l e s t
o
Lo p s p s t
fi
s e c o n d Q u a r t i l e Q2 :
T he se c o n d q u a r ti l e , Q
z
5 o%
,
’
œ
is a v a l u e t h a t h as h a l f ,
ar e a t ab o v e i ts v a l u e
A l so ,
.
T he
o
q u ar ti le ,
sec o n d
50%
r
Q2
,
’
,
o
/ gi
f t h e obser vat i o b e l o w i t s v a l u r
•
,
is a lso th e
; s a
m
p l e 511 p e r c e n t i l e
an d
p o 5o
.
,
•
.
Q2 i s c a l l e d t h e s a m p l e m e d i a n j Y
.
,
Sm a l l e s t
•
I
ト
Valu e
t
1
i
10 ?
5 0
Va l u e
-
\w
,
T
\
v 7
-
.
a in
M
\D
Q3
T h e t h i r d q u a r t i l e Q3 i s a v a l u e
,
Q u a r tile
,
and 2 5%
e
a t h a s th r ee f o u r th ,
,
"
at Y
its v alu e
.
o r
7 5%
f the o b se r v a t i o n s b e l o w
o
,
T ii t t h r d q u a r t i l e , Q
3 , is al so t h e s a m p l e 7 5
th
p er c en t il e,
h -
’
Q3
1h M
U
n g en eral,
L a r g est
.
4
T hir d
?
.
’
K
be l o w
ß3
.
t
he s a m p l e x
th is v a l u e ,
a n
" ’
p
e r c e n
d at l ea st (l o Q
t i l e
s ec o n d
Q u ar tile
-
Q2
Q,
th at at l east x %
T hir d Q u a r ti le
-
2
-
Q3
v J . t
1 5 p« c e \ \ \ e
o f
. 2
-
o
m
e
T5 % p e r c e n t i l e - P
o
5
dia n /
, 5
th e o b ser v ati o n s ar e at o r
.
5% pe r c en t ile - p
ß
50% p e r c e n t i l e - p
o
-
•
.
.
is a v a l u e s u c h
F ir st Q u a r t i l e -
Po 7 5
110 75
A
x ) % ar e a t o r a b o v e t h i s v a l
ue
-
h t
i ts v al u e ,
.
7
jY
5
Scanned by CamScanner
15
#
T he f o l l o w i n g r u l e s i m
1)
2)
le p erc en ti le
p l i f i e s th e c a lc u l a ti o n o f s am p
Or d e r th e n o b s e r v a ti o n s f r o m
sm a l lest t o l ar g est n u m b er
D e te rm in e th e
hi c h i s t h e r a n k o f t h e s a m p l e J
p ro d u ct n x % ,
w
u
n rp le q
s an d sa
is
o b se r v a ti o n s
˘
Ra n g e
w h o le
a
s
.
t
»
p
ercen til
e
.
sl
’h
b) I f n x %
a rtile
n u m b er,
s
a
y k,
c a
lc u l a t e
m ean
th e
of
the
an d
k
(k + 0 )
o
rd e r e d
.
R
T he a m o u n t o f v a r i a t i o n i n a s e t o f d a t a i s d e s c D b e d b y t h e
R
To g e th e r
le n g t h
m
,
a x
An d m i n
.
.
v
a
=
Max
M in
-
_
.
lu e s d e sc r ib e th e i n te r v a l c o n t a i n i
ng
all o f
.
.
I n t e r q u a r t i le R a n g e r gR
T he a m o u n t o f v a r i a t i o n i n t h e m i d d l e h a l f o f th e d a t a i s d e sc D b e
jgr
fi
=
d b y th e
@
争
ヒ
B o x p 1o t s
Uartii.%A
g ,ed
in
a
wh k ’ ’ "
•
e,
r d q u ar ti l
d i n g f r i 1i f i r s t t t h e t h i
bo x p l o t T h e c e n t e r h a l f o f t h e d a t a
in e e x t e n d s f r o m
i th i n t h i s b o x A l
r e c t a n g l e T h e m e d i a n i s i d e n t i f i e d b y a b ar w
im um
ti le to th e m i n
d an o th e r l in e e x ten d s f r o m t h e f ir st q u a r
th e m a x i m u m
,
.
e
x
t e n
IM
.
by
a
is r e p r e s e n t e d
ile t o
th e th i r d q u a r t
.
.
.
,
.
a n
x £’
q
!
,
/ vk
,
£
,
r
’ "
0n ,
_
on g
set s
o f
,
Scanned by CamScanner
16
Ex a m p le
A te a c h e r g i v e s a 2 0 po i n t t e s t t o
l
-
国 15
i*
.
’
Br o m
+
p <\o \
o b sm
c o r e s a r e sh o w n b e l o w
引
圆 回 国 国画
1
4he
or &t r
.
l s t u d e n t s T he s
\
’
1h h i sh e s Y
’’
’’
’
,
’
T
’
m
s
R an
X
.
.
,
H
s
_
.
e
R
c an s
b e* L
L =
H p d
•
H
_
吧 • .
\
q
.
z
M
n
p
u j e
r om\ n3 W Y
\k a
sAi
-
-
o n z
’
1 n
ens
•
11c
/, ;
•
r
"
•
A
:.,t/:
: +tm
.
g ,
k
4d \e n
Wy r
e)
\
( );
园
’’
。
F F i n d t h e f oUowi ng
a ) Fi r s t q u a r t i l e Q ;
l
1o
=
\
.
2
=
" d
&
’
3 d
«
+m
% W a Hc u e
m a Js e
b
.
2)
D raw
c bl e
a b o x p lo t f o r th e d ata
:
03
•
\ e
疝ヒ 酬
a出
tp r
W 如
w
e
s
w
s
C
8
\b
n
u\
II
2e
2 1
仙 对
旧
d
产キ
h ,& 1
2
N
t
8
Scanned by CamScanner
17
Scanned by CamScanner
-
T h e c a l tm & t i o n
*
o f
jY a n d S
.
u r i t = l a t a
U
tg w
.
la m
th e m ea n
a n d
th e v a r ia n ce fo r
-
d
1
sa m p le M
ea n
-
x
n
S a i n p ie M
jY
-
ea n
j
x , •
.
1
-
栉
Sa m p l e V a r i a n c e -
’
S
_
n
(.
-
n
,-
a
"
Y
1d
w h ere
X i .
j
c l a s s
Th e
=
t h e
m
a r k
o
f th e i
c o r r e s p o n d i n g
F
B»
c l a s s ;
.
f re q u en c y ;
c i a s s
’
•
k
=
t
he n u m b e r o
c l Æs s e s i n t h e d i s t r i b u t i o n
.
-
t o t a l
o
i
u la fo r m
=
p e e n t i l e
a n d
t h c q q a r tjle &
L
.
f 2
\ m
k w
.
:
c l"
b. ui/
ary
.
V z
1 o
e
.
i
o f th ,
c l.
1
, e
-
!
g wp
f1
b
c
Eh o
s th a t . o n ta iD ,
t
c 1\ l m
.
. .
l o s s
! at
(,w
I
g. . u r d a :a
ip
1
.
JS
>, u E
t<« d
n x %
-i ;R"rc
, n t ile r an k
=
n x %
.
"
e
a /
-
1
;
w h er e
1
j
f fr e q u e n c i e s -
t he f ow
-
’
=
c l .
t h e
s
n t , r v a l
/i
=
t h e
c u m
u l a t i v e
fz
’
"
e
c u m
u l a t
fr e q u e n c y j u s t b e f o r e t h e c l a s s t h a t c o n t a i n s
iv e frew
en cy
j u st a f ter th e c la ss th at c o n ta i n s
)
6
c
n
. .
n
,.
n x %
n x %
.
Scanned by CamScanner
19
o
Scanned by CamScanner
Scanned by CamScanner
Scanned by CamScanner
C H M & Pr o b a b M y
Se c 3 1 -
-
m
l
er i m t m
A
.
1
•
.
p r o b a b ilitY m
r e su l t s c a l l o u t c o m es
.Ev en ts
p ro b ab i l
ex perim en t is a
ity
p ro ce
O u tco m e
*
Sa m p l e S p a c e
A
an d is d en o ted b y 5
-
de f i n e d
.
ia l o f a p ro b a b i l i ty
A n o u t c o m e i s t h e r e su lt o f a s in g le t r
*
w ell
lea d s to
ss w h ic h
.
’
" * UAS)
m ent
ro b ab il ity ex p e r i
ssib le o u tc o m es o f a p
sa m p l e s p a c e i s t h e se t o f a l l p o
.
(
I
•
W
p r o b a b il i ty E x p er i m e n t
•
Sa m p l e S p a c e
1
.
111 5
fi( S) -
e t h •\
T o ss t w o co in s
i 5
b
H 1
l 1
B H B\ l H T
r 1
»
e s
.
+
.
A n sw er a tr u e/f al se q u esti o n
n
S.
Ro U a d i e
Ja «
/
o u \ -
S)
l 1 T
n
( S )
z /
.
=
r
4
r l
4
.
•
h
’
2
c\\ T
)
1 s
5
a 5
C
)
3
C
4
) * 1p
Ep
4
W
W
el s
Ex a m p l e
1)
n e d ie tw o tim e s)
t i m e (o r ro l l in g o
l i n g tw o d ic e o n e
o
l
r
r
f
o
e
c
a
s
e
p
F in d th e s a m p l
.
D ie n
四回囫
本
•
国
庄彐
回
가보卫国刻 小
い
•
• 3
い旧
)
L쁘
• • •
し飞
s )
. . 인
S )
山
, ’
"
y刭
\ 3
I 쁘
气午
Scanned by CamScanner
Scanned by CamScanner
Ex a m ˘
&
R o i l i n g t w o d ic e a n d o b se r v e t h e n u m b e r s f a c i n g u p
e
bo t h d i e s h o w t h e s a m e n u m b e r
t
˘
.
H
.
n
h
H
F
H
a
H
. 3
.
U
,
r
r 1 h $
,
H
.
h
n
.
n
E X a m T o ss in g t h r ee c o i n s o n e t im e a n d o b ser v e t h e f a
A=
e v
e n
t
o
f ge M n g a t l e a s t t w o h e a d s
-
L
.
•
o r m em
ev e n t o f g e t t i n g a t m o s t t w o ˘
.
z
L
m \s
•
T
n T
,
m
i l
n n
a
I T
n
n
,
a n d o n e t a il
ev en t o f g et ti n g t w o h ea d s
1
¡
Un i
•
+\ T T , T
1TI T
,
T
HIT T ,
T T
l
) 飞 0
H
)
\ \ H l
\ T \B . 1
\
H W
.
)
’
’
o T
\ T
& T
F in d t h e f o l l o w i n g e v e n t s
,
n
n
n
j
.
e a d a n d t w o t a i 1s
ev e n t o f g e« i n g o n e h
b z
a &
H
m
S=
)
.
* » « FT T T \
\C
or
A
b
c es f a c in g u p
3 \\
2 n
»
c
.
th e su m o f t h e n u m b e r s sh o w i n g is 2
G .
9 15
1
W
S a t Z 1 4H 3 3 h t
.
F in d t h e f o l l o w i n g e v e n t s
.
th e su m o f t h e n u m b e r s sh o w i n B is 6
.
.
.
T H
ents in
/ a l l e le m
< i nor i n 业
,
5 <
• •
s
m
s
部 d is d en
ted
y A
u
B
ーっ じ
.
e \h
o r
,
b d
h
+ U
-
s f w c«
a t
le as +
o ll e
7
U
M
& \!
=
’
j
Scanned by CamScanner
In te r sec ti o n S e t s
a l 1 e le m e n ts in
n d is d e n o ted b y A
n
B
% R u n e r qh
.
5
I Mh
o•
Cma u e me n t a l l e l e m e n t s t h a t a r e n o t i n A a n d i s d e n o t e d b y ˆ
S
ˆ
.
n o
\
in
r
.
S
=
n n di
A
\ Ru b
N el e
A Uˆ
im
l1 w W d
$
\
f
cr
=
ce Sets
l
l
el em e
n t s
t ha t
ar e
i n
-
i
n
Ba
n d
i s
de n o t e d
by
n B.
A
S
. .
,
On l s
Ne l e
%
-
n
e r e
is
낢 い吐 n
a
1y
3 d Bf
A
/
1
o c
o• cl
i t
em nc e
自n
t * 1
A
业本
on
b
A
l
l e l em e
t ha t
n t s
ar e
i n
B.
n
a
d
nd
.
i s de n o t ed
by
Bn
ˆ
not
in
A
and
a
,
Em
wi u t u a by A n
B
=
¢
S
e le m en ts
all
that
are
» n
.
,
5
4
h
b
e Rc lu s i q e
not
in
B
and
is
d en o ted
=
t» e
m
h Ba l l
j
8
Scanned by CamScanner
n o + B
田
百万 \
. 내
n 0 ’ s
=
•
m
=
ˆ
A A
r
/ )
L Bn M
n Ti ) U
\
R
1 .
aL
%\ W
OR
,e e \‹ m e
-
n e -
n b ;
&
A
’
o r
i n
A & n o\ \ n B
n n \
=
b
.
1
Q e q \o n
\
eqi on
8
•
.
C
U
#
R
n
$
Læ nn
u
cM
J
AS
o n e
»
j
o f
en \
J
b
. r
’
e M
U B
J G)
n
Scanned by CamScanner
S
.
,
U
( E/ h C ) W
A n (B u
U (
(
) -
.
æ -
In
a
C
l 5
su rv ey
o f
B
=
(A n
)
t r
2
l
1 5
\ r
, r
a
3
» l
140
.
V
’
) u (A n
B
C
)
L Bl R
1 5
L
,
q
,
(
R C
f i5
p e o p le
S
p eo p le
r eg u la r ly w r i te l e t t e r s ;
w as
it
t
)
m
,
I T
fo u n d
that
u se e m a i l ; 2 8
p e o p le re g u la r ly
-
V
r
S
r
re g u la r ly
u sE
u la r ly
p e o p le re g
a
t
-
u se a
e
«
p eo p le
39
t ened- wr i t e
l e t t e r s 5 3 p e o p i n e g u 1a r i y u s E a t e l e p h o n e a n d e m a i 1; ¡ ! p e o p l e r e g u l a r l y u s E e 1e a e r s a n d 3 p e o p l e r e g u l a r l y w r i t e l e t t e r s a n d u s e a t e p h o n e a n d e m a i l F i n d t h e f o l l o w i n g
/t e
r
.
S
- e h o i ¨ opr ll e tet e risn ot hr ee smu ar vi le?y d o n o tw r e g u l a r l y u s e
I)
f
t
(
p
u
u ¸
)
l
How
m a n y p eo p le in th e su rv ey d o n o t reg u lar ly u se
e i t h e r t e l e p h o n e o r e n 1a i l ?
n
( T u E
.
r
+
q
1s
\ 0
m a n y p e o p l e i n th e s u r v e y r e g u l a r l y u s e a t l e a s t 0
How
3)
)
n cs )
u . n
n ( T
4)
How
u w
=
JT ’
3 1
n
+
n { o n l
=
\ 3
Te
m
T
A o A y n se o n
( en i
th e s t\ r v e y
t Tu t h )
=
3 1
-
t s o
r eg u
+
q
la A y
=
r
u se t el e p h o n e o r
c
’ ’
"
em ail
b u t
t
n ot
’
T n w n e )
r eg u la r ly
.
\
3
"
w r ite
\
由 뇨
6)
q v s s +l o w s
« F
B
Z
gE )
•
io
0
.
iy o n e ?
S
peo p le
11
w
’
"
o
j w ) 1
r
s
+
Ho w m any
lett er s?
-
)
m a n y p eo p l e i n t h e s u r q y
n ( o n \
5)
u E
.
.
1¡
\f * u y d i o n
How
m a ny
p e o p le
the
in
n e?
r eg u la r ly u s e t el e p h o
n L t
n
w
n
)
•
su r v ey
r eg u la r ly
u se
e m a il
g
r eg u l ar ly
w r ite
let ter s
b u t
n ot
1
6
Scanned by CamScanner
b Qr s
-
4
+
o 1i c a t i o n o f c 11o i c e s
1
11
z
.
.
.
.
.
.
.
.
.
.
.
.
*
n
B
a n d f i n a l ly a n e le m e n t o f
Ex a m p l e
B AB
,
s )
o r
Ea m
•
t \\c4 d
,
o
w ay s o f c h o o sin
A
O an d
a lso
T
r .
he n i m
e le m e n t o f A z .
.
.
.
’
’
’
’
’
•
k
y ,
m a n y d if fe re nt w a s c an a
y
p at ie n t th u s b e c la ssi f ie
So l u t i o n
b lo x <
L
hoo . j p c
H
e le m e n t o f A
A
p a t i e n t s a r e c l a s s i f i e d a a c c o r d i n g t o w h e t h e r t h e y h a v e b l o o dj w
a cc o r d in
h i g h 1n % o w
1
i s 1o w
g to w h e th e r th e ir
1n a m e d i c a l s t u d
r
f irs t a n
g
> e ss u
-
n
,
-
o
n
m
a
,
o
r
,
.
ty p e a n d b l o o d p r e s s u r e ?
} e
h
o
J
.
W
:
•
3
,
N
Ex a m p l e s
1)
A
c o i n i s to s sed an d a d ie i s r o l l e d
.
Fin d t h e n u m b e r o f o u tc o m
’
o
•
c
s
W
=
s fo r
he
x
.
1
f ev en t ?
eq uence
1 2
4
2)
A n ew
car b u y er h as th e c ho ic e o f 4 b o d y
s t y l e s ; 3 d i f fe r e n t e n g i n e s a n d
10 c o lo rs
.
Ho w
m any
d i f fe r e n t w a y s c a n a p e r s o n o r d e r o n e o f t h e s e c a r s ?
h o
C;
.
UH L 3
m3 Y
A te st c o n s i s t s o f 5 m u l t i p l e
ho w
c
.
0
o
ho i c e q u e s t i o n s
,
it h e a c h q u e s t i o n h a v i n g 4 p o s s i b l e a n s w e r s I n
w
.
m a n y d i f fe r e n t w a y s c a n a stu d e n t c h ec k o f Fo n e a n sw e r to ea c h q u e st io n i
’
\ i sc a
4) T h e m e n u o f a r e s t a u r a n t l i s t s 4 s o u p s 5 s a l a d s ; 1 0
la d
Øe
di f f e r e n t w a y s c a n o n e c h o o s e a s o u p
,
h o
.
o
c W 1< s
3
_
r
XS
10
a
s a
5
,
=
a n
\ 0
e n t r
en trees
,
a n
an d
\ wb w2 d s z
a
ø
5
d e ssert s
.
In
how
L t Z
1
Z
+
B
m any
d a d e se r t?
0 0
Scanned by CamScanner
˘
Fa c t o r i a l 亘 里 耋
Sp e c i a l c a s e
园
0! 1
•
Ex a m p le
5 !•
S
9 .
•
y
Q
,
L X
C1 8l 1
> T h eo r e m
=
\
0
\ 1
xs1q k 3 X J L x
3 628 8 0
T he n u m b er o f w a s in w h i
ch
y
n
j
d i f +e r e n t o b e c t s c a n b e a r r a n e d i s n !
g
.
Ex a m p l e s
1)
In h o w
m a n y d if rer en t w a
h o
2)
¢m o
o
bs
y s c a n 6 di Te r e n t b o o k s b e a m
6
=
1 2 o
A sto r e m a n a g e r w ish es to d is
th is b e d o n e?
h o
3)
In ho w
o
B w aj s s
8
p l a y 8 d i f fe r e n t b r a n d s o f s h a m p o o i n a r o w
=
o
q
.
How
m any w ay s c an
3 2 0
m a n y w a y s c a n 10 i n st ru c to rs b e assi n ed t
o 1 0 s e c t i o n s o f a c o u r se i n s ta t i s t i c s ?
g
’ o
#
-
ng ed o n a she lf?
oc
.
W s
=
\ 0
!
T he n u m b e r o f
m -
3G
•
am
g8 b O
n g e m e n ts o f
j
n
o b ec t s o f w h i c h
n
l
are o f o n e k ind ,
1 1
a r e
o
z
f
b oo , L
E
e
x
a mp l
O1 o
Fin d t h e n u m b e r o f a m
a
, k
;
n g e m en ts o f th e lette rs o f t h e fo llo w i n
g w o rd s
) M I SSI SSI PP I
W}
’
o
’
* 1B
04 W
S
(
=
.
s
.
P’ 6
•
\
=
6
-
s !
•
2
3 1 65 0
s !
\
r
=
=
<
l
M
.
c
7
2
b ) C L A SS
’
’
=
5
L) &
h
\
o
•
o
<
S
Y
.
0
1
P
8 S
c
•
2
) C H A PT E R
o o
,
o\
k
s
=
¡
!
-
s
o
r
o
Scanned by CamScanner
n
ho w
m an y
o rd e re d
w a y s
c an
t e le v is io n
t im e s l o t s a l l o c a t e d t o c o m m e r c ia l s d u r i n
d irec to r
sc h ed u le
d if t
re n t
c o m m e rc ia ls
g t h e t e l ec a st o f t h e f i r st p e r io d o f a h o c k e y
th e
d u r in g
<
-
o i
• c1 s
g am e?
^q-
; l
n e
Ex c
.
.
˙
o
Œ【0 】
In h o w
G
U3 3 S
’
72o
=
.
.
m an y
o rd er ed
w ay s c a n th e te lev is io n d irec to r o f
c o m m e rc ia l s.
If t h e r e
are 4
d if te re n t
c o m m e rc ia ls .
o
f
3 Zl m l the 6 t im e s lo ts a llo c a te d
E x c .
w h ic h
.
a
g iv e n
o ne
is to
b e
sh o w n
3
to
t im e s
w h ile e a c h o f th e o th e rs is to b e s h o w n o n c e ?
Sd u t i o n
Pe r m -
¡
p
e r mu
T
h
e
h m
at i on
t
nu m b
i s
an
of
p r mu
e
e r
h Qr s
am n
g
h \
-
’ "
me
n t
of
ob j
t a t i on
of
r
ob j
e
p1
ce "
-
ec t s wi t ho u t
_
cH
-
w
r eo l et i on
wh e r e
ec t s se l ec t ed f r o m
a se t
of
n
or de r
i s i mp o r t an t .
di f f er e n t
L
)
ob j ec t s i s
n !
’
(n
Sp e c i a l C a s e
n p n
-
n
-
r
)
.
!
F o r e x a mp
5P 2
2 0
=
x
9P 4 =
q
3o| l
B
8P5 =
*
1
it b
(, 1 2 0
3P3 =
3
2 x l
9
Scanned by CamScanner
Ex a m p les
I)
F in d a l l a r ra n
3
-
F3
g e m e n ts o f th e le tte rs A B C
h
=
» x \
.
.
C
$
b
b cn
吕自ら
3
l
.
L
c
b
æ
c # B
2)
Fin d a l l t w o le t t e r
-
arra n
g e m e n t s o f t h e le tte rs A B C
.
:
3
ユ
=
3
.
2
3
t
L
x
.
b c
3
3)
I f th e r e a r e 9 c a r s i n a r a c e in h
ow
& o
.
(
¡
m o
:n h o w
q
=
p a
/
.
5
•
Ho w
a)
=
o
1 ? q
1
r 2 1
2 8
m a n y d i f k r en t c a rd s o f
*
S
x t <
c
C
=
G S
1
o
¥w
Pu
ic e . p r e s i d e n t
.
a
s e c
r e t a
r
. .
rs
t
.
? S
/
.
,
nd
p w
d
t h,J
a re u sed
/
.
<
Ex a m p le
In a sm a il g e o lo gy
c la s s,
e a c
h o f t h e 4 s t u d e n t s m u st w r i t e a r e p o r t o n o n e o f 8 f i e l d t r i p s I n h o w
.
m a n y d i f f e re n t w ay s c a n th ey c h o o se o n e o f th e f ie ld tr ip s ; i f
a)
/
N o 2 stu d e n ts m ay c h o o se th e sam e field trip ;
no
S
o 【
•
=
2S >
1 ¸
5
=
B
P4
16 8 0
b) T he r e i s n o r e s t r i c t i o n o n t h e i r c h o i c e ?
r口
C
车
5
二
名} \ 8
당
メ 8
•
u
o
q
s .
-
12 o
-
c + p
c b m
g
y
w
,
r
S
=
v
¢
o n A
o
|
1
a
di gi t scanbemadei f t hedi gi t s3 4 5 a
b) R e p e t i t i o n s a r e n o t a l l o w e d
.
c
a
t or +
3
m any
o
r Jo
o p e r
Cho e
*
R ep etitio n s a re al lo w ed
sr
d a n d th ird ? w
o q
w ay s c an th e 3 o m em
b e r o f a u n io n e le c t a
p re s id e n t.
an d a treasu rer?
0
( p
5)
s e c o n
.
a op s
.
y s c a n th ey p lac e f ir st,
bFc a » =
S
.
3
4)
no
m a ny d iH eren t w a
,
色
10
Scanned by CamScanner
i t
Co m b in a tio n :
C
*
o
mb
i
T h e
na t i on
i s an
ar r a n g
n u m b e r o f w
Sp e c i a l C a s e
a
y s i n
n c n
-
e me
n t
w h ic h
mwi
o
’
v
of
r
ec t s wi t ho u t r
ob j
o b
o n
l
o wh e r e or de r i s no t j . a !
t i n
.
F
je c ts c a n b e se lec te d f ro m a se t o f n
d if t
j
r e n t o b ects is
C O- l
n
Fo r ex a m p le
5C3 -
lo
«
r
v
5
p
3
6C4 -
1OC 7 -
gc o
X \
S
\
\
4C4 .
1 3
2
L O
\
-
\
Ex a m p les
1)
F in d a l l t w o le t t e r a m
-
’o
.
f u a ) ts
o
=
n g e m e n t s o f t h e le t te r s A B C
1
c
a
z
b
3
if o rd e r is n o t im
p o r ta n t
c B
.
h 9
U
ho
3)
.
S
O
=
S
•
˚ C
O n e en g in e e rin g g ro u p c o n s ists o f
a)
H ow
m a n y d i f fe r e
in o
-
o
S
5 m en and 7 w o m en
j
ct
ear ns
an b e form ed co
s C
L
x
3
t p ro
1
C
=
.
si
i
f
g
2 .
"
I
\3
.
. .
En ?
39 0
b ) I f Z w o m e n r e f u s e t o b e o n t h e s a m e t e a m t o e t h e r ho w
g
be f o r m e d c o n s i st i n g o f 2 m e n a n d 3 w o m e n ?
,
m any
d if fe re n t
j
p ro ec t team s c a n
m
ho
.
h
S C A
S
S C3
H
:
\D
9
+
C \ \ s C
M pn
.
Lb M A
)
.
*
3 D
.
3
0 0
1 l
Scanned by CamScanner
’
J Y4 Si
3
.
l
a
j
5 jM
so
w ay s
can
0 1 W
I
> ,
26 m
A c a r t o n o f 1 2 r ec h a r e a tr l e b a t t e r i e s
c o n ta in s
g
in s p e c t o r c h o o s e 3 o f th e b a tt e r i e s a
Z
th at
a re
d e fe c t iv e
In
.
how
m any
th e
n d g et
a)
N o n e o f th e d e fe c t iv e b a tte r
ies;
11
’
D
n n
b)
c)
hb
S =
W
c
l o
=
( Omd i e n t
9
;
1
0
\ 2
o r J Qr
\ 1o
=
n 0
q
B’" f o r i
.
3
)
/
\
and
8
B o th o f th e d e fec t iv e b atte r i
es
¢
.
o
S
W
.
1
C
Z
\o
X
L
C
=
r
A t le a s t o n e o f t h e d e f e c t iv e b a t te r i e s
.
o
t
s
.
w
=
e)
4
o
O n e o f th e d e f ec t iv e b atte r ie s
r o
d)
.
2
l 2 C 1 x lo c -
X
o
+
(
+
l
c 1 «
ª
o
t
.
A t m o st o n e o f t h e d e fec t iv e b atte r ie s
n D
.
e
4
:
W
=
•
2
( 2
x
x
1
C
lo
c
•
\
o
.
\ ?
+
q s
+
1 •L
h av e
4
d i f fe r e n t
\
)
o f
m o f c
o r
z
o r
L es
b
D
D
( 0 9
y
o r
a d
•
\
\
0
10
1
-
.
9 C 2
Q o
\
C o
o
Q
.
;
W C,
o
s
\
x
\ 1 0
1o
c
3
•
a
\ o
.
f
o
)
Ex a m p le
On
a
sh e lf
w e
m a th e m a t i c s b o o k s
a)
In h o w
m an
i
p h y sics
b oo ks,
w a y s c an b e a m
d i f fe r e n t
5
c h e m istry
b oo ks
d i& eren t
n g ed
#CS
A l l th e b o o k s ;
( r
˘
.
6
-
˘ S
.
8
)
了
M a t h e m a t ic s b o o k s to g e t h e F
( 1 st )
4
o
r
dn e boo k
s
4 g l
m•
.
2 : « Z I
c)
h s
Ch
•
’
J 2
.
’
\
M a t h e m a t i c s b o o k s t o g e t h e r , c he m i s t r y b o o k s t o g e t h e r a n d p h y s i c s b o o k s i o g e t h e n
3 :
s
!
1
1
=
‹ q
(, * 9 q v
.
X
S
1 2 q
(,
d) A ll m ath em a t ic s b o o k s o n le f t sid e
l *
8 Y
.
1 q
0
.
1
l 1 0
r
o 3
0
+
W
c
h
\
o
\
.
)
m
\
-
m
8
b
W
n 9
o f
\ ec
’
.
V
2
12
Scanned by CamScanner
m
Pr o b a b ili ty
• C l as s i ca l
:
pr ob a b i l i t y as s u m e s
Fo r e x a m p le
,
t ha t
he n a s i n g l e d i e i s r o l l e d
w
sa mp l e sp a c e
al l ou t co m e s i n t he
,
e
a c
h o u t c o m e h a s t h e s a m e p r o b a b i l i t y o f o c c u r r i n g Si n c e
.
th e r e a r e s i x o u tc o m e s, e a c h o u tc o m e h a s a ro b a b i l it o f
y
p
T ha t i s
*
>
:
P ( 1)
,
Equ a l ly
P (2 )
=
P ( 3)
=
=
ar e eq u a l l y l i ke l y t o oc c u r .
P ( 4 ) = P (5 )
1
/6
P (6 )
=
.
=
(ew
:
l ik e ly ev e n ts a re e v e n ts th a t h a v e sa m e
a i l ity o f o c c u r r in g
p rob b
• h e cl as s i ca l
T
l 8
•
l i ket )
,
pr o b a b i l i t y co n c e p t
T he p r o b a b i l ity o f a n y e v e n t A
o u tc o m e s i n
u m b e r o f
N
A
is
’
To ta l n u m b er o f o u tc o m es in S
T h is p ro b a b i l it y i s d e n o t e d b y
Ex a m p l e
P
(A )
l f a f am i ly h as 3 c h i ld re n ,
n
(A )
n
is i
=
•
f in d t h e p r o b a b i l it y t h a t 2 o f t h e 3 c h i l d r e n a r e g i r l s
.
So l u t i o n
Sa m
‹ il
p
l e.
n (S)
ł
.
)
"
*
.
1
8
e
CN=
o 4
e
q
h n
j
h ( S )
Se c
m
p
s s h le
m
.
T h e A x i o m s o f P r o b a b im
*
T h e A x i o m s o f P r o b a b il i ty
v
a
) O[
P (A ) 5 l
b)
P(S )= 1
c)
If
A
an d
fo r e a c h e v e n t
A
a
.
a re m u tu a l ly e x c lu s iv e ev e n ts in
B
B
)
in
S
n e d
t o
S
,
t
he n
P(A )+
=
P
(B )
,
) O[ P ( A ) [ 1
b)
S
.
P(Au
T ha t i s
in
L p cer t o m
fo r e a c h e v e n t
EP
P (S ) =
=
A
.
1
a ll o u tc o m es
in s
’h
w her e
P
1
=
p
r o b a b i l i t y
t h a t
a s s i
g
t h e
i
o u t c o m
e .
13
Scanned by CamScanner
E x c 3 3 5 P 64 A n e x p e D m e n t h a s t h e 4 o s s i b l e m u t u a l l y e x c l u s i v e o u t c o m e s A
p
C he c k i f t h e t b l l o w i n a s s i n m e n t s o f r o b a b i l i t a r e o s s i b l e
g
p
y
p
.
.
.
(A )
P
0 38
=
.
P ( B ) = 0 16
.
,
atl c u
b)
P (A )=
.
31
(A )
0 32
=
.
1)
b
P;
y
.
A
Siæ
P \
.
3 1 + l9
.
o u t co m e s
C
P ( C ) = 0 28
,
P(B )= 02 T
,
P ( D ) = 0 35
.
,
.
.
2
l
b
.
P ( D ) = 0 16
.
,
18 t
.
\;
.
=
t
.
l
.
1
+
«
4 11 o • ( t m
P
.
,
«
.
2 )
c\
-
P ( C ) = 0 11
,
P ( B ) = 0 27
,
B C and D
.
g
a)
,
J •
-
•
0
P (C )=
,
&
0 06
,
o
L e h q m
0
-
p
.
P(D )
,
=
0 47
.
.
1
< o
Se c 3 5 S o m e E l e m e n t a r v T h e o r e m s
.
.
1f A r , A z .
*
.
.
.
Ex a m p le
.
.
.
.
.
.
,
An are
A, n 1 n
.
e e v e n ts in a sa m p le sp ac e
-
n h,
-
-
_
.
S
,
e a
s
y
o
,
r
v
e r
y
e a sy a r e r e s p e c t i v e l y
th a t t h e s e r v i c e a b i l i ty o f t h e n e w
a
)
b) D if fic u l t
,
Pt
r
c)
o
a v
e r a
e ,
.
,
,
.
.
,
,
.
.
o r
e a s
y
,
.
.
Pt # ) z
)
b
P t ¨ ) -
;
o
=
•
.
\
\
35
o
.
1 o
U F
.
o f
A v er a g e p r v e ry ea sy
PL U
l a s e r p ri n t e r w i l l b e r a t e d v e r
d i f f i c u l t d i f f ic u l t
y
0 11 0 16 0 35 0 28 , a n d 0 10 F i n d t h e p r o b a b i l i t i e s
P( V
)
g
,
laser p r in te r w il l b e rated
D i f f ic u l t o r v e r y d i f f i c u l t ;
P( D O V
he n
0
T he p ro b a b i l it ie s t h a t t h e se r v ic e a b i l ity o f a n e w
a v er a g e,
t
c
)
=
0
•
.
31
O
-
\
=
0
•
45
14
Scanned by CamScanner
:
•
n
˜
1 en t aa m
r
e ms
牝レb \ %거
and
B
arc an
y ev en ts in
S
P(Au
1f A
and
B
a r e m u tu a ll
t
.
)
he n
b 4 \
P(A )+
P
y e x c lu siv e e v e n ts in
S
B
=
P(A n
l f A is a n e v e n t
in
y
S
【
r A
and
B
)
B
(B )
t
.
PI A n
-
m
1
=
P(
-
S
,
Or
)
Pc
o i)
p
1
=
p (A )
-
r y
¡l’ " "
. .
n o t d iv is ib le b
y
A
Be .
D fr o .
)
P(A)
=
P(A n
-
l
th .
Ug h 5 0 0 0 0 ,
h u 7
)
B
.
.
t
(¢) i
P
s
P (
b 1
.
.
J =
1
-
s
P
c s )
P (D )
’oYd n¸ti:
ba t i s t h e
w
a \ v ;
\ b lt
b
˜
d\ s \ b\ e 6 j
2 o o
j
9Q\ \ n h
u n b t r
2 ; o
J
n t "\ )
.
\
=
o
? s
9
.
ir
a
. .
b. .
0
rq1 9b
o
_
M
-
r u
-
^i
»
1 n
Z0 0 ?
g e< m s n u m b u
.
t
u n
P t f
\ 1t j
m u Bm
t h e n
P{ ˆ
’ "
m
u ø ) .
P( t l h B ) =
P« n u i i ’ .
-
a . c
’
P(A n
˘ BM
æ om <
t
.
=
1
e r ( \u s t v e
are a n
y ev en ts in
E˙
q
W C pd \ b U
.
飞U
一
b4
u n \ on
-
he n
P (¢ ) = 0
=
)
B
he n
t
,
P(A)
a)
n 凶nn h サ 名
\
@ lr A
.
5 0 00 0
5
d
o 0 0 0
-
b w
b) d i v i s i b l e b 2 0 0 a n d 3 0 0
y
?
T
B.
9d3
. p m b i\ H \
.
b
d \ u \ s】
hum b tr
w
b
k
sel "
b3 D
(¢ a s t
.
1. ’ " r
o
14
=
.
Ln
p
) \.
p
+
\
b
)
p,4 n
_
ˇ. X#
.
.
)
U S *
W h
P[ e ) =
n
313
_
c
c
0
0
.
j
L
.
g$
•
.
14
, k
o
k
n
B
t :5 )
【 n
b
\ ; L
.
n ls )
§ D D 0 0
n d b
) -
5 b 0 0 0
3 b o
1G 6 L
.
JG\
Sßo o o
h
¢
d ) di v i s i b l e b y 3 0 0 b u t n o t 2 0 0 ?
pt b )
b
l\
1; b
2 W
J
X
.
¢ L C F
3 0 0 ?
.
B )
.
A A WL
d i v isib le b
y Z0 0 T
> ( #
V
2 . 3
C0 0
c)
\
n
c b m n ,p
_
P t n r ) 13 )
-
p
c b
n Bi )
_
’
"’ 1
=
-
15
Scanned by CamScanner
_
. e
工
a)
W he n w e r o t t a
W
.
g e tt in g a su m
o f 7
A
a
b)
o f b a la n c ed d ie ,
rv
)
.
G
K G
)
•
ha t a r e t h e p r o b a b i l i t i e s o f
w
.
9 6
9\ nl
gett in g a s u m
o 4
n
w
o f 2 o r
10 ;
p ¢ B u c
p
1
\
p
+
-
’
c)
g ettin g an o d d su m
b
q\ nj
_
˘
.
a c rack
d efec t
is 0
.
03
a
,
n
d th e p ro b a b il ity
e t c h i n g
P( h
•
Pc c
o
.
,
.
b
a
,
P ( t r
d
V en
•
&
o
"
’
"
0
3
2
0
h
•
2
0
’
/
i
V
R d t 1
t o m
.
a)
W n at is th e p ro b ab i l ity
LE U C)
L3
a tu
a
-
O
P ( ¨ 自己 )
c)
_
0
.
"
o r a c ra c k
$ C )
P(
_
an etc h in g
1
\
•
•
O
•
˘
W ha t i s t h e p r o b a b i l i t y
(
m a n u f ac t u r e d c h i p w i l l h a v e e i t h e r
th at a n ew ly
PCE ) ˘ P c e »
.
Pc E u c ) .
b)
.
th at it h a s b o th d e fe c ts is
.
Jp
么’
•
百瓦
th e p r o b a b i l ity th at it w i l l h a v e
.
i
P( B O c )
g T he p r o b a b i l i t y t h a t a n i n t e g r a t e d c i r c u i t c h i p w i l l h a v e d e f e c t i v e e t c h i n g i s 0 06
W
0 OZ
-
s u m
一
.
)
.
n ( s )
Ex c
e
c
Su J n i b w
ewi r r y
"
’"
L
-
.
¸{v )
2
0
-
•
\
o
0
•
0
1
r d efect?
t h a t a n e w l y m a n u f ac t u r e d c h i p w i l l h a v e n e i t h e
.
Pc 1 D C )
•
P
(
0
r
m
1
=
)
Z
0
.
P tt
-
u c
)
\
-
o
.
o
1
.
o
•
1 3
Q3
w ill h av e o n ly o n e d efect?
th at a n ew ly m a n u f a c t u r e d c h i p
W h a t is t h e p ro b a b i l ity
t
o
e n i
w t )f t
p ( c
.
)
jc)
PcE ’
-
c )
•
PL m
l
= Pt c )
P c c n
) +
-
PLM
c )
)
]
16
\• j A3 t wm
Pl o n
E) t
’
.
P t o n 1j c ) =
0
•
o
q 1 0
•
0
l
0
.
OS
Scanned by CamScanner
Scanned by CamScanner
Scanned by CamScanner
Scanned by CamScanner
Scanned by CamScanner
Scanned by CamScanner
Activ ity #3
a)
S ix p e o le l in e d u
p
p in a q u eu e f o r a b u s
1)
Ho w
m an y w a
&!
2) H o w
y s c a n t h e y e n t e r i n t h e b u s?
1 2 0
•
m an
.
h)
y
W a 1o
e n \ e r i n \ h
i F t w o p e r so n s r e f u se t o f o l l o w
eac h o th er?
t h e e k si
+ \ 5 4
P
b ) 200 s t u d e n t s
r e g i st e r ed
o f
an
i n st itu te
w ere
129 o f
f o r c o u rs e
i n t e r v ie w e d
th em
fo r
re g ister ed
c o u rse
and Y
1)
m a n y o f t h e m d id n o t r e i s t e r f o r e i t h e r c o u r s e ?
g
n t
x u y
th ey
and
reg ister ed
50 o f
them
(
e n ’
=
)
.
th em
fo r
j
A ’
.
n
t
o n \
j
’
.
S
o
F o
t
w h a t is
P し)
Lu v
ii
He/t h e r eg ister ed f o r c o u rse Y
P
=
(
K
)
-
l lo
t hl t h
P t x n
-
So
u n t en
bl h a
b u t n o t f o r c o u r se X
1
o
r om
a
.
-
Pt i n
o
at
y )
zeo
b * D lw
w
12 o
H e l sh e r e g i s te r ed f o r a t l e a s t o n e c o u rs e ;
)
•
. a
PL
.
o f
o
f a s t u d e n t i s se l ec t e d a t r a n d o m
i
W
r e g iste r ed
h v
f t h e m r e g i st e r e d f o r e x a c t l y o n e c o u r s e ?
n
.
.
2)
3)
Y
g
co u rse X
How
j
su b ects
the
fo r
» *
i
’ "
)
=
? o
ユ 0
2 2
Scanned by CamScanner
m
T he
it io n a 1-
c o n d i t io n a l
p ro b a b i l ity
Pr o b a b i l i ty t h a t e v e n t B
i r A an d B a re a n
’
o f
an
ev ent
B
o cc u rs a fter ev ent
in
A
’
y ev en ts in
S
and
(B ) ¢ 0
P
4h ;S c m A m \
•
r A an d
1
B
a r e an y
ev e n t s i n S
and
an
ev ent
A
w as
d efi ned
as
th e
g i
v en
B
.
he c o n d i t i o n a l p r o b a b i l i t y o
t
,
P(B )*
,
A) ¢ O,
P
(
A n
P (B / A ) =
to
A
m \
W
P(시 B )=
:
r e l a t io n s h i p
h as a lr ea d y o c c u r r ed
B
t h
.
e co n d i t i on a l
)
p (A) *
,
P(A)
pr ob a b i l i t y o f
B
g i ve n
A
5e l •
C\
A
o
q tqm
b
T
co n &
Br o n
.
a la n c e d d ic e is r o l l
八
。
S
.
4\ r s <
u们
e su m
i’
ha t i s t h e p r o b a b i l i t y t h a t t h e
y
d
4
d 1t
g
t
A .
.
m u l t i p l ic a t i o n
>
I
5
J
( C ,
,
/c h
h’ e
Mt dt j e<ct i on R u l e p ( seq uen c e
U
)
J
n
pcF n
T he
d
マ
( C .
1b
1 ’
rule
can
H
L.
.
)
"
.
to
find
th e
p r o b a b i l it y
.
•
L A
h
.
r
+
.
5
:
’
m
u sed
W
3
’
Ew n t sB
be
. 1
;
o f
tw o
or
m ore
e v e n ts
:
th at
occur
in
th e b o x :
9
.
f A an d
B
ar e an y
ev e n t s i n 5 ,
P(A n
o x
B
P LA n
)
B
t he
n
P( A )• P(B IA )
=
)
P(B ) •
=
P(A)+
,
(A I B )
P
P(B)+ O
,
Ex a m p le
A b o x c o n t a i n s t h r e e r e d b a l l s a n d t w o b l u e b a l l s I f tw o b a l l s a r e r a n d o m l y s e l e c te d f r o m
.
a)
W h a t i s t h e p ro b a b i l it y t h a t t h e m
lr t
2
’
_
,
o b a l ls a re r ed
k )
Y
b a l l i s Bl u e a n d t h e s o q d
b) W hat is t h e p ro b a b i l i t y t h a t t h e
o n e is red
.
Ȭ
’
t
di n) 9 h r s v •
b P L
-
c)
W h a t i s t h e p ro b a b i l i t y t h a t o n e i s r
g an d o n e i s bu
0
-
3
.
23
p A :l n b
N
e ,n
a
1
t
P
L B
,
h R1
pt M
•
ub . \ l N
r
p
t m
.
p t cd b n
Scanned by CamScanner
*
In dgpen d en t E ven ts
Tw o
ev e n ts
A
an d
B
o c c u rr in
pr o b a b i l it y o f
E
v
e n t s
an d
A
B
B
a re
g
in d e
pendent
ev en ts
if
the
fac t
th at
A
o ccu rs
does
no t
a f rec t
the
.
a r e sa i d t o be
i nd e p e n d e n t
if
an d
A on a B
on l y i r &
mJ
cl s
P(A n
Ex a m p l e
an d
y
A
c o in
is to ssed
o n th e d ie ?
and
c
\ h
a d
B
)
P ( A ) • P (B )
=
’ b
i] i s r o l l e d F i n d t h e p r o b a b i l i t y o f g e t t i n g a o n
.
d o es
e
e
•
¢
th e c o i n
d 1A J
1u o
+
uo. <
So l u t i o n
PL $ r r )
Pt ; \ )
•
-
.
Pt r ) =
1
,
上 .
L
11
\
i o h
r e g
Ex a m p le
a)
F i n d th e p ro b a b i l i t ie s o f
g ett in g
F iv e h ead s in a ro w
w ith a b a la n c ed c o in
’
b) T h r e e 3 s a n d t h e n a 4 o r a 5 i n f o u r r o l l s o f a b a l a n c e d d ie
h
c)
F iv e
a
,
3
,
3
m u l t i p le
1
m
c ho ice
H
.
q u estio n s
3
.
P˘
an sw e r e d
•
P a H Pu
c o rrec t ly ,
h 1 n
i f fo r
eac h
q u estio n
the
p ro b a b i l ity
o F
1
an sw e r in g it c o r re c t ly
is
.
d ) F ir st a 4 a n d th e n a n u m b e r le s s t h a n 4 i n t w o r o l ls o f a b a la n c e d d ie
F (
,
( tes s 4 hp n r ) )
P
t
4
.
C
1 o e
L o R
3
)
.
)
24
Scanned by CamScanner
t
Ex a m p le
A
w hat is th e
b o x c o n ta i n s
<
g tra n s i st o r s < o f w h i c h a r e d e : c t i v e ] r 3 a re se l ec t e d f r o m t h e b o x
,
.
,
p ro b a b i l i t y t h a t o n ly 2 a r e d e f e c t i v e
1o
a)
w
ith o u t re lac em en t
p
;
=
f
«
1
or
p
c
e
N
3
-
c o 1L s 1z
(
b) W it h
r
)
,
4
.
+e m s
o 4
a \ , u m b Br
oJl FoW
mS
)
l
t p ac em ent \
Co u x
\ w
( n w nb u
j
c*
oJ ro
m m <s )
5
0化
二
昏
一
刀
Ex a m p l e
A and B
S
L et
A
an d
B
b e tw o
a re i n d e p e n d e n t e v e n ts
ev e n ts in
,
f in d
S such th at
P
(A )
=
0 4 an d
.
P
(A u
B
)
=
0 7 If
.
.
(B ) ?
P
g
’
m
\n mdl mc
dL
E<
C U
P( $
n
)
=
PL $ ) ;
P c u
o
b
.
•
)
1
9
e
3
=
b .
PtA
=
1
L
•
f \ b
Pt b )
-
Pt
)
)
r t $hb
-
G
.
U
Pt
)
)
P( b )
25
Scanned by CamScanner
Scanned by CamScanner
A m o n g t h e 2 4 i n v o i c e s p r ep a r e d b y a b i l l i n g d e p a r t m e n t 4 c o n t a i n e r r o r s w h i le t h e o t h e rs d o n o t If
.
.
w e ra n d o m l
y c h ec k 2 o f th ese in v o ic es.
a)
ha t a r e t h e p r o b a b i l i t i e s t h a t
w
B o t h w i l l c o n ta in e r ro rs
上 A
3
내
9
。2
.
一
不了
3
b ) N e i t h er w i l l c o n ta in a n e r ro r
-
’ o
0
P t 1e
0 0
b
6)
2
,
t n u
e r r o r s
/
\
.
\a c eH )m
P
u
c o
.
»
c x
1 o
.
\3
2 1 l
-
EX j
.
N
w
e
20
r
.
_
_
il l c o n t a i n a n e r r o r
_
x
q
3 a
.
2 C
1
m
23
r
d) A t l e a s t o n e w i l l c o n t a i n a n e r r o ;
(
\
o r
1
3
e)
l c o n ta i n a n e r ro r
A t m o st o n e w il
2 t16
1
2
u C
)
\
1 3
.
L
Scanned by CamScanner
Scanned by CamScanner
A c tiv i ty # 1
A t a lo c a l u n iv e rs it
at ra n d o m
a)
52%
y
o f i n c o m i n g f i r st
-
ted
y e a r s t u d e n t s h a v e c o m p u t e r s 1f 3 s t u d e n t s a r e s e l e c
.
Fi n d t h e f o l l o w i n g p r o b a b i l i t i e s
.
N on e have com
p u ters ;
\1
b)
A t 1e a s t o n e h a s a c o m
( l c . zc )
o k
Pt \ c , Z
=
c)
0
.
)
2
5
( + c , rz
c + c
r
T
X
p uter
•
(
.
) o R
.
i
) ˘
A t m ost o n e has a c o m
F9 l (
.
=
)
2
o W
.
p l
9 s c 1 +
4
.
d ) A 11 h a v e c o m p u t e r s
(.
.
.
.
\ c
J
t
\
.
d
F
\
p
. . J
-
e
.
D
n
v
L
=
o
=
r
•
48
)
)
1
,
Fa m
4 .
,m , \ o r
.
.
1
, oi
1 c
p u ter
(
J
o . q ) Sc z
( o w h . \
+
c
3
-
s
.
n
.
881
• • • o • "
,
+ P t s
X b sg i o
. . Z
c
a
mo h A )
m
( o
p r
z g
.
T
48 ¢ 3 C
]
c
D E V
o
\
E X / ; \
( b tBg
N
1
.
.
\5 ; 1 S
\ Ci 2 s
U
.
b
.
W
\5 6 25
.
1 3s 4
\s c
鱼c t i て丝了 丝
A bo x c o n t a i n s 5 r e d b a l l s 3 bla c k b a l l s a n d 6 w h i t e b a l l s If t h r ee b a l l
s a re d ra w n r a n d o m l y
t h e b o x , f i n d t h e p r o b a b i l i t i e s t h a t c a n b e o b ta i n e
d
,
)
a
.
o » R )
,
-
\
5 03 . r C.
.
.
3
O .
.
o
x
/
-
H
0
<
e i. . L
h A
u
t
3
1 1 C3
11 9 a
dD
d
。
.
"
.
ミ
"
,
) A t lea st o n e re d
F(
=
"
•
•
•
3
( w h l e 1
去 유 六 늙
P’ "
a
3
N ei t h er r e d n o r b l a c k b a l ls ;
c)
\R
.
S C
2 l
C\ q 1
ls
AU r ed b a l ls
P( ?
f ro m
Pt 2 8 .
l
I A q
\
.
9
L
.
C 3
o R
1
5
a n
X, .
Z
P t
A
_
rq c
3
3
. k
w
1 )
,
.
\
c
3
x
q
c
.
.
3
4 6 3
i s
.
4
q
29
Scanned by CamScanner
Scanned by CamScanner
tro m
ag ency
F
.
I f 10%
o f the c ars tro m
U ,
1 Z
%
o
c
f
a r s
t r o
E
m
,
a n
4
d
Y o
o
+
m
1 r u
c a r s
e
g w i4i 1
ba d t i r e s
\
w
Ah
a
r
m
-
9
w
l l a
"
n
\
m s ˙ o r
a g t
u r $
t ir e t
h c a r o r 1
’
P ( h 1D
3
’
.
"
1
J
三二 • 彰
工 俨ベa 卅
show
( w e g Dd
T
a)
Q LN M
•
P
)
(
e •
L
0 . O
P( F 1
)
&
1 \
c B \ 0
.
b
.
\
+
1 + p t c )
0
.
*
2
0
.
•
P t B\t
\
L
0
r
P ( F )
)
,
;
0
4
-
o
.
P(
e . 0
s
T
d
t4o
w ill g et a c ar w ith b a d t ir es?
W h a t i s t h e p r o b a b i l it y t h a t t h e f i r m
P t » t
n
h t o r -
)
IF J
1
+
0
.
0
1
1
e
.
0
2
l
t
8
P ( F )
.
(D )
• Pt
b
\1
»1 T Pt
c<
r e iF
.
• p[
l
7
I A
)t
,
J
PL ˝
• Pt B
\F )
cg o
&go
B0 0 0 0
e
6
31
Scanned by CamScanner
Ex c u
m E x c 3 7Z l = i #
.
At an
.
.
e le c t r o n ic s
it i s k n o w n
p la n t,
w o rk e r w h
t h e c o r re s o n d i n
p
g p r
Pr o g r a m
.
f ro m
i
p a s t e x p e r ie n c e t h a t t h e p ro h a b i l i ty
’
the co m
pan
y
s
t r a
in i n g
p ro g ra m
is 0
gil i t y i s 0 35 f o r a n e w w o r k e r w h o h a s n o t a t t e n d e d t h e c o m
.
i r 80% o f a l 1 n ew
u o rk er atten d th e tra in in
g p ro g r am
.
.
86 t h a t a n e w
w il l m eet the
p r o d u c t io n q u o t a a n d
’
pany
s
t r a
that
in i n g
.
-
Q
-
q
j\
no \
a)
W h at is th e
p ro b a b i l i t
+
y th at a n ew
0
to o o o
’
t r a
in i n g p r o g ra m ?
•
w
d
)
o \
-
1 4
w o r k e r w h o m ee ts t h e
p r o d u c t io n q u o t a w i l l h a v e a « e n d e d
/
Pt A )
\ o n
l o o o o
b ) W ha t i s t h e p r o b a b i l i t t h a t a n e w
y
the c o m p a n y s
<u d
w ork er w ill m eet the
p r o d u c t io n q u o t a ?
-
\o oo o
Q (p
P( q r $ ) +
f t A
) .
P[ q \i »
.
’
E
=
.
s
158 )
32
Scanned by CamScanner
A c tfv i ty # 3
th e f o l l o w i n
Are
U s¢ t h e i n lb r m a t io n o
n t h e t r e e d i a ra m
g
o f th e g iv e n f i u r e to d e te rm in e t h e v a l u e s o f
g
g
=
O•
r
\
0
A
and
B
i n d ep en d e n t e v e n ts ? w
.
T ˙
b
=
•
3
ny ?
p
( n
n
)
+
T˘
.
p L
)
<.
c A F
)
R
&
.
o
8
•
»
ß
w
e
•
’ "
m
F . A ?
1
6
B
t
5
’
r o +
+ A C\ u s \ 4 t
j
et t : l o j
d) If t h e c h o se n n u m b e r w a s e v e n w h a t i s t h e p r o b a b i l i t y t h a t i t c a m e f ro m b a l a n c e d d i e
\
?tt
n ’
)
,
u s
33
Scanned by CamScanner
A ct iv ity # 5
1n a c e r t a i n y e a r , t h e r e w e r e 1 5 0 g r a d u a t e s f r o m
T he r e w e r e 3 0 f e m a l e m a t h
s
tu d en t s an d 2 5 m a l e m a t h
s
U O B ,
f w h o m 8 5 w ere fe m a le
o
m
F
V
w
w
\ h
s
w
+¢
.
.
Pt I H )
a)
•
.
Pt m \ & )
M
.
tu d e n t s
i
g
W h a t i s t h e r o b a b i l i t t h a t a r a n d o m l s e <e c t e d g r a d u a t e i s a m a l e ?
p
y
y
P( M
=
)
C
"
.
ts
o
( .
.
3
3 o
t?
b) W n at i s th e p r o b a b i l i t y t h a t a r a n d o m l y s e l e c t e d g ra d u a t e i s a m -
P{ m t
•
e( W i
)
-
Pc b
荟 森
•
P« m l t
十
)
-
P( H )
暴 长 智
•
•
’ "
•
ate is n o t a m ath
W h a t i s t h e p ro b ab i l i t y t h a t a r a n d o m l y s e l e c t e d g r a d u
c)
二
三い う
。
8 5
8 S
ーー
一
05
1 b
m ath
d ) 1f t h e s e l e c t e d g r a d u a t e w a s a
e)
니乃
、
s
ソ
弘
丘
二
=
.
s
tu d en t?
0
.
3
30
is a m al e?
tu d e n t . w ha t i s t h e p r o b a b i l i t y th a t
ected n ot a m ath
th at a r a n d o m ly se l
it
W h at is th e p ro b ab il y
X
s
tu d en t g r a d u a t e i s a f e m a l e ?
.
34
Scanned by CamScanner
Ac tiv ity # 6
Um
I c o n ta in s 5 r ed b a lls a n d 3 b la c k b a l ls
.
U r n I I c o n t a i n s 3 r e d b a l l s a n d 1 b l a c k b a l l U r 11 I I I
.
c o n ta in s 4 ,
.
p’ "
固
p
-
’r\ t
R ち\
a)
lf an u m
i s se l e c t e d a t ra n d o m
Pc R )
=
P ( 1 )
毛)
P t > U
P\ R \ X
.
fi n d t h e p r o b a b i l i ty i t w i l l b e r e d ?
P (m
)
-
P( R \ E
)
q
s
=
を!
a n d a b a l l i s d ra w n ,
P ( 良医 》+
.
\
구1
一
b) I f t h e b a l l d r a w n w a s r e d f i n d t h e r o b a b i l i t
p
y th at it w as selec t e d fro m u m
,
’
Rm w )
P ( ˜
t
1
.
(
M
m
)
.
.
_
.
_
k R)
Pt k )
c)
If a b a ll is d r aw n fro m eac h u m
PAe1n J md
P(
)
P t e1
ß n e
. .
e pa
b o * e g
)
.
T
f in d th e
p ro b a b ility th at a ll b a lls w il l b e b la c k ?
c se k c ;
=
) 1L P ( b m
" l ed
I I I?
. r o m
e w dh
b
o h
c
. ndepqndt
l
)
35
Scanned by CamScanner
S ho u a
4
.
e 4 N3
fi
1 Random
p ter 4
f* m M
m m
D is t r i
-
(
n d o m
A
•
Va r i a
ra n d o m v a r i ab l e i s a n
y
Ran d o m
’
.
:• Q /
o n
c t 【
b
cAi As
V a r ia b l es
s
#
cf heFr oai \ )
m
;
r
_
r o n
_
.
ml l e
.
f u n c t io n th a t a s s ig n s a n u m e r ic a l v a lu e t o e a c h
p o s s ib le o u t c o m e
.
v a r i a b l es a r e u su a l l
y c l a s s i f i e d a c c o r d i n g t o t h e n u m b e r o f v a l u e s t h e y c a n a s s l 1m e
f 1 a n d o m Va r i a b
.
(o m +
D is c r e t e v a r i a b l e s h a v e a f i n i t e n u m b e r o f o s s i b l e v a l u e s o r a n
p
be c o u n te d
o m
’
i n
g q
b o r e
( n o
in f i n it e n u m b e r o f v a lu e s th a t c a n
S
dpAs j
.
Fo r ex a m p l e
o
T he nu m ber o
o
T h e n u m b e r o f s t u d e n t s w it h B
« w ti n u w
g
p h o n e c a l ls r e c e iv e d a f t e r 4 p m
a
n
m
in S ta t 2 7 3
V a £ i ?m
Co n ti n u o u s v a D a b les h a v e v a l u e s in
ra t h e r th a n c o u n te d
)
a t c e r t a i n o f f +c e
.
th e
in terv a l b etw een
an y
tw o
g iv e n
v a lu es
(c a n
b e
m easu red
.
Fo r ex a m p l e
o
T h e te m p e ra tu r e
o
A \ l p h y s ic a l
q u an tities
g oes t o m 6 2
to 7 8
d istan c e
p ressu re an d so o n
P ˘ b a b i l i t y Di s i b g t i o F D i s c r e t e R a n d o m
T he p r o b a b i l it y
to g e th e r w ith
d ist r ib u t i o n o F a d isc r et e r a n d o m
t h e ir p ro b a b i l it ie s f
(X )
=
P (X
-
.
V aD ab le
v a ri ab l e
X
X
is a l ist o f th e p o s s ib le v a lu e s o f
)
\ =1 )
r
•
K .
1
X
)
T he p ro b a b i l i ty d i st r i b u t i o n a lw a y s s a t i s : i e s t h e c o n d it i o n s
f (x )2 0
fo r a l l
x
E f( )
x
an d
=
1
aH x
gi l l e
C o n s t r u c t a p r o b a b i l i t y d i s t r i b u t i o n f Dr t h e s a m p l e s p a c e f o r
So l u t <s n s
, 1)
.
F9 w
L )
=
P
t
a *
,
0
1
•
t ossi ng b a l a n c e d c o i n s
y /
.
C
L
=
.
p
%
36
Scanned by CamScanner
Scanned by CamScanner
Scanned by CamScanner
Sg c 4 4 0 1 M m
.
*
.
T he
A l s o , J1
*
the V a r ia n ce o f a P r -
m
D i s t r i b u t i fi
o f d isc rete p ro b ab il ity d istr ib u t io n is
i s c a l l e d t h e 0i r s t m o m e n t a b o u t t h e o r i i n
g
T he sec o n d m o m e n t ab o u t th e o r i
g in is
m
\
z
E X
A
l n g e n e r a l , t h e Hh m m
t he
a
.
o r i
l 5
’
E(X
=
/
\n
5
H X
.
)
E
=
J
A
.
f (x )
.
au X
#
Th
o f d isc r ete p ro b ab il ity d istr ib u tio n is
¡
z
{ X
-
-
•
p
f (x )
.
al1 x
cr
z
2
Or
E (X
.
G
z
)
z
[E ( X ) ]
-
ca¢
z
_
-
/
L
e
1
nd l
h
T he s ta n d a r d d e v i a t i o n o f d i s c r et e p ro b a b i l i ty d i s t
r ib u t io n is a
-
/E (
X
-
» q
8
p )
.
ˇ
0n M A
H
o
c
u
(X )
’
(r
Or
-
cr -
JE ( X ) [E ( X ) 1
-
11
z
-
p
39
Scanned by CamScanner
E x a n 1p l e
nc tio n
l f th e g iv e n f u n c t io n is a p ro b ab il ity d istr ib u t io n fu
四国团团1
ダ( X )
3
1= 团
1
国国1 四 国 I
I
_
4
K
Fin d th e fo l lo w in g
a)
T he v a lu e o f
b) T he m e a n
K
p
Z
c)
T h e v a r ia n c e c r
d)
T he s t a n d a r d d e v ia t i o n e r
.
So l u t i o n
4
\ n ce
,
-
A
i
l
L A )
-
.
pr o b
a
.
AB \ bu<i on
\
叼坚 剑
围园圃
2 q
10
)
[ ;
.
e v
.
=
c
r
=
m
q
=
o
.
Qu 3 r
40
Scanned by CamScanner
.
.
b
H
&
’
co n
•
D
w
1
n s
w o
:
•
A
bi no m i
al
ex p e r i me n t
i s a pr ob a b i l i t y
e x p e r i me n t
1)
T he r e m u st b e a f i x e d n u m b e r o f t r i a l s
J)
I
4
i
e
IF X
•
N
u m
b e r
o f
tr ia l s
N
u m
b e r
o f
s u c c e s s e s
p -
-
1
-
P r o b a b i l
p -
p r o
-
.
n
in
n
-
’
,
t
a
c pnc 4 d t ¢Q d l g
o
s ,\
y
o
f
-
f a i l u r e [
,
S o
t r ia ls
tr ia ls :
i ty o f s u c c e s s
b a b i l i t
˙ a ) se
,
•
’
-
>
"
’
-
"
-
’
>
Ar b e n
.
c o in is to ss ed t h r e e t i m es
me
an
an d
t he
va r i an c e
of
the
Bi
M ean
no m i
-
v ari an c e Ex a m p le ;
A
b a lan c e d
c o in
de v i a t io n o f th e n u m b e r o
f r
co n d i t i on s
f ou r
Fin d t h e p r o b a b i l i t y
.
o f g ett ing ex a c t l
y
t w o h ea d
?
L
=
•T h e
ng
1
.
Gwt 1 aq
n
兰˘
f ol l ow i
T r
y o f a su c c e ss m u st r e m a i n t h e sa m e fo r e ac h t r ia l
X •
n
_
:E
c
t he
.
ha s a b i n o m i a l d i s t r i b u t i o n
Wnere
:
sa t i sf i es
o u tc o m es o f e a c h t r ia l m u st b e i n d e en d en t
o f o n e a no th e r
p
T he p r o b a b i l i t
Y
t ha t
p t d
p ) <bl c o$
n
Ex a m p le :
A
•
5 0
E (x ) = p -
s
t
n
’
_
c r
n
lim es
.
Find
ar e
1
(1
p 1
=
h ea d s t h a t w i ll b e o b ta in e d
o
s
c r
l
l
B
N
.
=
p
-
A\ sBr i n
\W
w
p)
the m ea n ,
n
p
c \\
•
’
.
t
p 1 i p)
-
v
p
n
he v a r i a n c e
and
the
sta n d a rd
.
5
p ( \
-
p)
+
1 S
( \
b a lan c e d d ie is r o ll ed 3 6 0 ti m es
’
n u m ber o f 4
-
p
V On a n c e
to ssed
di st r i bu t i on
上
=
)
is
al
ha t w M
b e m u ed
.
_
)
=
2
5 •
Fin d th e m e a n
<
•
\ 1
.
\
w
M s s m aM
( 1h m
ort
an d th e sta n d a r d
’
d ev i a t io n
or e
h
J s ,
o f th e
.
So l u t i o n
ヘ 三 360
=
m e o 1l
.
"
f
.
3 6o
•
.
G O
41
Scanned by CamScanner
o n e stag e i n th e m an u : c tu re o f i n te ra ted c i rc u i t c h ip s ,
g
re c e iv e a th ic k e n o u h c o at in
g
g
.
a
c
o
a
in g m u s t b e
t
Fin d t h e p r o b a b i l it ie s th a t a m o n g 1
s
鹰
t
一
"
d) L e ss t h a n
e)
l l w i 1l n o t h a v e t h i c k e n o u
g h c o ating
B e tw ee n 3 a n d 6 w i l l h a v e th ic k
e n o u g h c o at in
g (b o t h i n c l u s i v e )
.
’
:
召
how
*
. "
.
Fin d t h e m e a n a n d th e v a r i a n c e o f
th e n u m b e r o f c h i s th at w i ll h av e th ic k e n o u h c o a tin ?
p
g
g
So l u t i o n
: 0
3 t no\
•
Qn k
d h co c& g )
, n
-
国
目 录
=
\ o
!
P.
O
.
P( A
.
3
) r
P( ¥
-
J
r
a r
\ l 0 o
-
P ( X
-
1f
2
v a ri a n c e cr
1
\\ )
(
ra n d o m
0
-
5
Pt r
t
1
•
&
)
1
+
O
P( K
r
•
1
q lL t
P
.
v ar ia b le
D
.
3
•
X
o
Sk S
+
Be
V
has
b
.
B
b
m B
B ino m ial
r 习
q
\
_
o
.
zq
h ts i
.
0
1
1
L
•
=
•
O
\
S1
6 8
d e o
d i st r i b u t io n
0
_
& <h t s v i h a
w i th
m ean
o ¢
w
\o n s )
IO
and
-
p
5 F in d P ( X - 2 ) ?
_
.
i
.
\o
t \
-
PJ
=
,
u
T o
/
.
S
l
it
a s
. .
T
v ø iA
p q a
.
t
<
J
二
匦 加
4 2
v
q
m
bet
ms h o u l <
Scanned by CamScanner
e<
:
!
•
<
v p e r R e o m Øt r i o D i s t r i b u t i o n
w
ac se of sa m p l i n g t h o u t
T he m ea n a n d t h e v a r i a n c e o f t h e h
•
vDer geo{ r i c d- o
e me n t - h
p b c
\
w
E X C 4 26 P 9 3 I f 6 o f 1 8 n e w
.
\
.
.
tha t a b u ild in
a )
•
a
z
ar i a nc e -
a
a
n
(N
1
_
c r
•
n
a
) • (N
-
n
-
. Nes
)
b u ild in g in a c it
y v io late th e b u ild in g c o d e ,
ha t i s t h e p r o b a b i l i t y
ill c a t c h
w
m o ra n d o m ly s e l e c ts 4 o f th e n ew b u i ld in g s f o r i n s p ec t io n
g i n sp ec t o r ,
( tu l e \ e
At \ m u m b <
y p e r g eo m e tr ic d is tr i b u tio n a r e
M ean = E ( X ) =
gA
A
8
N
i nna S =
mN l
w
,
N o n e o f t h e b u i ld i n s t h a t v io la t e t h e b u i l d i n
g
g cod e
b) O n e o f t h e b u i l d in g s t h a t v i o l a t e t h e b u i l d i n
c)
T w o o f th e bu i ld in g s t h at v io lat e th e b
g code
Hd in g c
d
d ) A t l e a s t 3 o f t h e b u i l d i n g s t h a t v i o l a t e th e b u i l d in
e)
;
\ c s
«nc 1d
nd
g cod e
t
B e t w ee n 1 a n d 4 o f t h e b u i ld in s t h at v io late t h e b u i ld i n
g
g co d e ( b o th ex clu siv e)
F in d t h e m e a n
.
a n d t h e v a r i a n c e o f t h e n u m b e r o f t h e b u i ld i n s t h a t v i o l a t e t h e b u i l d i n
g
g code?
-
6
/
Y
0 1
q
8 Cq
( ¯
P
a
\
.
\
o
)
W
C
4
Y
C )
P ( t
1
.
L
6
=
)
1
C
1 3 11
.
I 2
4
CZ
"
.
3
2
3 S
18 C 1
3 ) +
e l
\ A
p t
n
-
z
P (
4
)
=
い
=
胖
p
b
r )
=
•
2
(
2
b
n
.
N
.
pt x • n
+
し "
(. ). 1 c 1
-
.
. .
»
\
-
Q =
-
A
\ 1
.
.
a y N n
•
1
0
•
gz 3 5
t
0
.
B
.
O
l ah
•
.
o
0
-
1 s
r o
4
lq
们
ユ
.
O
o
sq z
o
•
0
8 33
一
트
겨
上。
c r
p
(N
-
\
l
Scanned by CamScanner
)
J
Ex a m p l e
mp d : M !
l es t e
r
b o x c o n ta i n i n g g o h = l l q o f w h i c h
A
< a r e w h i t e l f ! o f t h e s e a r e r a n d o m 1y s e l e c t e d
Fi n d
.
_
( 3
t h e p r o b a b i l i ty t h a t 2 o f t h e m a r e w h i t e
e
t
m
\
?o
a)
h o l
)
l f 1h e s a m
p l in g is d o n e w i th o u t r e p la c e m e n t
’
J X
’
"
l in g is d o n e w ith
( #
u
1 p
)
q eo
r
m d
r e p la ce m e n L
A r T mo n )
c
3
W
P
& w b.
3
a o C 3
h =
3
ヤ•
P
*
*
\ ゐ }
r
=
년
그
•
一
-
.
ら
•
L
1
.
mi a l
a p p r o x im a tio n to h
y p er
g eo m e t ri c d is tr ib u t io n
b j p s rs e e h t \ n c
N
a i s
Mn ’ " l
.
o
¥
p -
E x c 4 28 P 93 A s h i m e n t o f 1 2 0 b u r
p
.
.
.
ar e ran d o m l
y
se lec te d
and
sh ip p ed
to
g la r a l a r m s c o n ta i n s 5 th a t u e d e fe c t iv e
a
c u sto m er ,
i
n
o n e b a d u n it b
y usin g
L \
m
;
d
t h
e
p
r o b a b
i l i t
y
61
t h
t <
a t
q
t h
.
e
i
H
L
h
1f 3 o f t h e s e a l a r m s
c u
s t o m
e r s
, * >
w
1B
i l l
o
g
w
1o
"
.
P P
n
i
. J
n
e t
w
_
’
So l u t i o n
d
H
˙
01 C r
x
n s
c 1
0
.
.
h
N W
3
.
"
Y /
n
•
3 8
1
\
?
3
bt
n
.
P •
P
t
1
\ a
\
P•
_
˜
\ L
3
Y (
\
e/ )
.
e A te J
o
i
r
a pp r o 7 \ m a B \ o n
S h o
t his
r
» w
F
Scanned by CamScanner
w
w s m
th a t t im e is
g iv e n
:
•
T
f tim e,
is t h e a v e ra g e n u m b e r o f s u c c e s s e s p e r u n it o
If ˜
he
me
-
t h
e
p
b
r o
a b
va r i an c e
of
the
pr o c e s s e s
Po i ss o n
be
i hon
2
V
-
a r i a n c e
c r
’
s s c fl
\
\ s
4
_
1x o n
& e ¢e n
\
hm A
•
1
d
A
\ w v\
-
"
X
s 4\ u e )
( p
lc m
ar e
dD eg
e d
su c c ess d u rin g
f x
o
i l i t y
lo
t he
\4
s
e n
b y
an d
an
t h
r ] B D ‹
El
SW
.
Pr o v e t h a t f o r t h e P o i s s o n d i s t r i b u t i o l=
So h
(
f
x
)
.
( 吼知 \
-
’
\
니
9
ユ
.
.
下
。
’
)
( ¢ t 1)
E¥ J
.
§W
.
1
1o
t .
.
1)
A t a c h ec k o u t c o u n ter c u sto m ers ar ri
v e at a n a v e ra g e o f
\
.
a)
a t m o st 4 w ill a r riv e in a n y g
iv en
•
5
.
er 们 \
n
Fin d t h e
o
m in u te ;
D \
b CW = 4
.
b)
a t lea st 3 w ill a rr iv e d u r in g a n in te rv a l o
P( x
5
)
3
Q0
) 1 So
w e
s h c, s 1 . し
n i n u tes :
-
t r
oc ont r + v i \
=
b
\
s v
•
5
\ h m
.
1
.
3
p
e "
j
m
\ n
)
Scanned by CamScanner
J ppw
.
y
.
.
\
巨ヨ
’
p Ss b l t
.
"
2 1
バ
2 1
!
.
7
in —l ?
巨式
ノ
•
c m
F
;
J h \
姓扒 一怀古
b y
)
b
cw
&
ブ
’
t m
ok
b y
.
.
,
1
r /
マt 和
飞 フ
P 之二 = \
ユ
。
.
ー
9 一
》
9 -
Scanned by CamScanner
c)
a t m o st 2 w il l a rr iv e d u rin
g an in te v al o f 6 m i n u
马
三
e
1
0
(J O
.
d) betw een
P
o
+
+
\ \
o
•
rc
P
•
U
=
n
0
o
•
=
o o 0 \
O
•
e o
L
w i l a rr iv e d u r in g a n
W
L
.
,
上ず争
트
t o 7 c a l l s (b o t
4
w
i o
\ q
’
J 프
t
-
H
2 1
=
三イ
二
ー
1
» lm
es;
in t e rv a l o f 1 8 0
s e
J
a
=
m
\ n
P
r
’
0
\& q % d O N 1 o % +
•
O
=
Ex a m p le
•
v a r i a b 1e
I f ra n d o m
•
\
8
.
b
.
(9 8 2 1
=
b
h a s p o i s s o n d i st r i b u t i o n w i t h
X
.
6• \U
H
S
=
2 Fin d / 1
=
.
E (X
z
c
, n
l
b
)?
So l u
H
.
x
A t
\
.
)
?
•
s
v a r ,
•
t
m
c
c
A CA ’
1
c t p1 ) =
ニ
ユ
+
•
ら
t ゴ
If
-
r an d o m
v a r ia b le
X
h as
P o i s so n
d istD b u tio n
E (X
=
w ith
P
)
2
=
.
飞
Fi n d P ( X Z
)?
飞
c厂
、
豇分 )
So l u
。
•
3 &1 q
-
Z
D
.
し【 q
)
1 、
-
しら
\
飞
飞
• A飞
L
2
\ 、
ー
-
r eedJ l m
S q r,
46
Scanned by CamScanner
Scanned by CamScanner
Se c
.
T heo r em
-
.
’
c h e b y s h e v # l l il fi
(V e r s io n
th at th e v al u e o f th e r a n d o m
r o b a b i l i ty
’
m o st
v a r ia b le
X
has the m ean
v a r ia b le d e v iate s fr o m
/
1
an d v a rian ce
th e m ean
/ 1
by
( \
\
o n ’
on \
bd h o ¢
w
Q C; u ) A ( c h
\
D
d istr ib u t io n o f a ra n d o m
l r the p ro b ab i l ity
p
wQ 8 n 1 < r-
&
1
hA
)
J
a n
a c u n p lcm en
Z
cr
at least
w
t
,
he n t h e
K cr
is at
N MB S
•
J’
it is w r i t t e n a s
s y m b o l ic a l ly
(B
[
p
(Pt x
/1 +
K cr
K "
,
]• P t x [ p
-
K (T
天
*
ー
。 ,
P \ ち
ヒ丁
>
_
OR
k (T
-
X
P
-
.
k
’
"
c f
m
o
D[
一
。
,
•
( T
\
˘
d
c / t
’
˙ hgbyev
s
˘
4
iT i ¢
[-
eo r e m
.
q. H
t,a!
u
il
Z
If the p r o b ab i l ity
pr o b a b i l i ty t h a t t h e v a l u e o f t h e ra n d o m
-
C
(
3
•
弘
P c
く
X
ヒヴ
ー
-
k rr
h as th e m ean
v a r ia b le d ev i a t e s f r o m
/ 1
th e m ean
an d v arian ce
/ 1
b y
G
less th a n
,
K
t
he n t h e
a
is a t
k (T
-
レ丁
X
.
\x p l <
ー
v ar iab le
d ist r ib u t io n o f a ra n d o m
ー
ド 〈k 丁
〈 哦
<
eJ w
く
<
.
.
v
!
象
铲啕 k
-
k
G
)
丁
\
-
t
48
Scanned by CamScanner
e
cr
T he a n n u a l n u m b e r o f r a in y d a y
!
9
-
is a r a n d o m
v ar ia b le w ith
126 a n d
-
/ 1
.
’
W hat d o e s C h eb y sh e v s T h e o r e m
in t h e g iv e n c ity
c
i n a c e rta in c ity
. "
Pt
4 .
D\ 9
q o
L
l
4
w
it h K
,
¡ he o r m !
-
tel l u s ab o u t t h e n u m b e r o f d ay s t h a t it w i l l r a i n
in an y o n e y e ar
a h
c h
H .
s h ev
j
1 k A
ls w
L
一
PC q q
,
K
ACCOr
«
1 5 3
C h
)
=
e lo
t e l l u s ab o u t t h e p r o b a b i l i t y
bd \
s
’
j «h e u
s
ax
1
lBL
(
m
w
o
h
A
is
s in g l e d ie
pr o b a b i l i ty o f h a v i n g t h e
So l u t i m
. .
<r
’
.
N
上
。
pt \
.
ACehn5
p
-
o
1 t 1
J
s
.
t h a t it w il l ra in
in
th e g iv e n
c ity
&)
k
t q k . 6
<
b u
b
4
s
q
d ay s in an y o n e y ear?
\ 3)
; o
o
d
d o t i
r a 1r l
and
’ "
rotn y
区
’
9 9
0
&
b ) W h a t d o e s C h e b y s h e v s T he o r e m
be tw e e n
b 1 >
w
1 8 0
ro lled
nu m ber 5
=
.
W hat
’
s
e in
r
’
d o es C h eb y sh ev
t
a
p
45 ?
s
T
he o r e m
te l l
u s
ab o u t the
J 1e 4
,n
.
o
3
g o
t im es
m
m
s
•
B
=
5
"
ch e h
j s
h eu
’
s
+ k
tr
=
3e % k
•
k
.
s q
q s
E
+
w \
49
Scanned by CamScanner
: . XXS
り 、 낵0 ら
甲(
严
宁ニ
k丁 〈 X
:
: U= C˘
,
:
k 丁
) ンノ
’
’"
’
’
"
m
く
3,
じヤ
’ ’ "
长乞
\ 06
L <
u sc
"
ー
3 0
nx i 11np1
te l l ’ ’
t
n c u y s n ev
o
<
<
w
;
)
35
s
i n eo r e m
[o
s h o w
t h at
t h e
p ro b a b il ity
is
at
le a st
th a t
in
I U U O U
3 6
to s s e s o f a
b a la n c e d c o in th e r e w i l l b e b e tw ee n
o f h e ad s w i l l b e b e t w ee n 0
.
47 a n d
0 .
4 7 0 0
an d
5 3 0 0
So l u t i o n
rh
\oo o
d * eu d 1
.
.
r
1
b b\ n o m
a i\n
n -
l (o
head s an d hen ce the
p ro po rt io n
53 ?
,
L
(
n
.
•
4 \
k
¢ . +
=
W
\ a )
4 2 so o
i
.
3 &
( ト
ー
とず く 久 く \ A t
는 •
ヒ cr
k
一
) 》 \
-
七
氏丁虱
니
、
.
3S
P L
W oo
< s
<
s
o o
l
1,
50
Scanned by CamScanner
m
M
How
m a n y t i m e s d o w e h a v e to
10 3
0 0 1 t h a t t h e d i tl
1l i p a h a l a n c c d c o i n l o h c a b l e m
’
rc nc c b etw e e n th e
.
p r
o
d
eA l M
p o rt io n o t
a s c rt w itl1 a p ro b a b i lity o r a t m o s t
’
t a i 1\ a n t l
So l u t i o n :
JA
0
.
5 w i 1i b e a t 1e a s 1 0 04 ?
.
4’ "
d t a Gt
*
T
P c p o r\ \c q
e+ +o i
A m r
\ n
s
q
\o
.
Ch eb
y
[ h ev
’
s
T hm
.
上
kz
仅丁
.
10
=
O
W
0
•
o
4
n
gA
h w
\
g a l
w
l sp / edt
’
bl o t t
p
.
t o
n b
l
i
l
y i s . ql oi l
1
2s d
cr
=
m
4 1
h
\ 5
•
E
L
6 2 9
51
Scanned by CamScanner
C+
Se e n m
n ml mi r b i l i t y D e n s i t i e s
,
Ra n ˘
n g ou s
V a r i a b l es
c o n t i n u o u s v a Fi a b l e s h a v e v a l u e s i n
ra th e r t h a n c o u n ted )
th e
d
lu e s (c a n b e m ea su re
g iv en v a
tw o
in te r v a l b etw ee n a n y
.
( ¢1
Fo r e x a m p l e
o
T h e te m p e r a t u re g o e s t o m
o
A ll p h y s ic a l q u a n t it ie s ; d ista n c e
P r o b a b i \ i t v l 1is
ir
X
is
(x )
=
to 7 8
p r essu re a n d so o n
o f a C o n tin u ou s
co ntinu ou s
a
62
P(X -
)
x
ra n d o m
Ra n d
v ariab le
.
o
( x ) is c a l l e d t h e p r o b a b i l i t y d e n s i t y f u n c t i o n
.
p ro
its
o f
v a lu e
th e
an d
.
f ( x ) is a p r o b a b i l i t y d e n s i t y f u n c t i o n i f a n d o n l y i r
c
-
C0
D s
f ( x) o
fo r a l l
f ( X )d x
an d
X
X
a t
b a b il ity
l
-
f e \ e
;t k )
o
Fr h
A \s
.
r
1
P(X
.
,
=
p (a [
.
)
a
0
=
b
x [
t m p" l h
)
1)
P fa < x [
b
)
P (a [
=
F (x )
w here
P (a <
=
)
x < b
- a
.
P(X [
=
)
x
( x ) is t h e p r o b a b i l i t y d e n s i t y
f (t)dt
=
.
o 0
<
x
e.
<
ˇ
)
1 _ 8 8
4 p[ a ’
-
d is t r -
Ot al
-
(
-
T h e Di st r i but i onBnct i on[ -
#
)
x < b
A
A
<
•
h
c
\ \oq
m
_
0
.
=
p
-
0
w
( o n %n u o u s
$b l
\,
c o
,
f u n c tio n
¢
-
1 ) pc
=
’
)
Re ma r
1
p (a [
.
x
[
d
3
.
*
f (x )
=
F
b
)
=
F (b)
F (a )
-
j
P’ ’ "
b
.
)
.
P( o 6 ’
b
(x )
.
d e n s ity
T he m ea n o f a p r o b a b i l ity
is g iv e n b y
C0
Oh a p<QB r
.
-
<•
T he v a r i a n c e o f a p r o b
is g "
a b i l i t y d e n s it y
2
cr
_
E(X
en
0
0
y
’
z
)
-
[E ( X i ]
2
.
/1
-
.
c
L ¢ \
=
L
A
r
.
.
( u )
p
CO
\
.
1
Scanned by CamScanner
h
Scanned by CamScanner
Scanned by CamScanner
Scanned by CamScanner
c-
>( J )
\Q
p
Co M n
5
=
:
1 < o
0
\
J
L t1
-
2
J
2
0
4
1
<
X h t
A
isn <
so
r
<o
K sE
2
A ro
.o .
n dl
k .
\
1
w
˘
k
=
-
k
5
3
Scanned by CamScanner
m
5 2 N o r m a i D ist r ih u t io n
.
æS t r i b u t i mo
A
ra n d o m
p r o b a b i l i ty
a *
m
v ar iab le
X
d e n s i ty
.
e
.
Co1$hwl +
w
X
2
N
1, c r
h a s a n o r m a l d is t r i b u t i o n
w ith
2
m ean
p
an d
v a r ia n c e
cr
if
an d
ir
o n ly
its
is g iv en b
y
!.
T he N o r m a l D i s t r i b u t i o n h a s :
-
m ean
m
e
d
-
i a n
m
o
.
.
.
_
.
,
n
de
sy m m e t ry a b o u t t h e c e n t e r
50%
of
v alu es
the m ean a n d
le ss
5 0%
than
g rea te r
tha n th e m e an
’
YT
3,
˘
.
6
e
0
"
.
0
-
1
-
5
A ll n o r m a l l y
by
d ist r ib u te d v a lu e s c an
b e t r a n s f Dr m e d
in to th e stan d ar d n o rm a l ly
d i st r i b u t e d v a r i a b l e
u s in g th e f o r m u la f o r t h e s ta n d a r d sc o r e
Z -
U
nbnu
ow 0
cr
,
W
r
ne
"
Z is t h e
(St a n d a r d S c o r e )
X is t h e v a l u e t o b e st a n d a r d i z e d
"
z
-
s
c
o
r
e
P
is t h e m e a n
cr
is t h e st a n d a r d d e v ia t io n
Z
.
人
8
t o 1 l )
F
56
Scanned by CamScanner
T he n u m b e r o > s t a n d a r d
"
"
z
s
c
o
r
e
.
d ev ia t io n s f r o
m
Ge t u sed to th o se w o rd s !
t l 1e m e a n i s a l s o c a l l e d t h c
A n d d o in
g th at is c a l led
A N u r m a l D i s l r i bl t t i o n
"
"
St a n d a r d S c o r e
St a n d a r d i z i n g
"
"
s
,
igm a
"
he S t a n c l a n l N o n m a l D i s t r i bu t i o n
T
4
)
:
b
T
bT
a)
L ess th an
2 . 43
< t
L ?
.
.
r
o
"
.
1 1 1
U
Fc
r t
•
<
-
2
.
4 1)
-
2
) =
Lo e
P (
<
P
1 1 l)
-
)
=
\
•
h e
& k not
. ro m
.
ヘ
P t B » O &
,
Ft1 )
-
S h o w jL
’
>
\
=
-
\
_
Pt t
F t o Bb ) =
•
-
1-
b
•
向
e8い 小 川
o
\q s q
十月 r
86 )
8 05 \z
•
57
Scanned by CamScanner
> (
.
F
up
EE
1 22 ;
-
d) G re a t e r t h a n
.
7
1 F
.
1 21 1
_
-
o r
I
1
なt しヒ
1
B etw ee n O a n d 1
e)
F( \ 1 )
.
:)
=
o
en
g) B e t w e
f c
-
2
rt
1
:
0
(
3 5 )
h) B e t w e e n
.
2
¯
•
888 8
B g L{ q
b
_
•
s
e\ o
=
•
38 1 q
.
6
_
.
0 82
-
1i 3 1 =
•
0
o q 3 o
.
.
.
3
-
•
Z 6 3 a n d 1 55
-
1
.
0
.
20 6 \
.
=
1 21 an d
-
0
22
2
F(0 )
_
Betw een
.
Fn
-
2 4 1 5S )
•
F(
-
?
-
1 6 and 1 6
.
.
Qr Cj 2
3 )
.
.
_
0
.
0 5 8
=
0
.
\ CA
58
Scanned by CamScanner
Scanned by CamScanner
r
m
.
)
p ( Z q Z.
1
=
a
Z oL
p(Z
-
)
Z.
a
=
-
of
t
Ht u n b
Ex a m p k s :
e r
Z o 025 7
F in d th e v a l u e o f
a)
-
.
So h l t i o n :
•
0
e .
s
t
b
-
t
2
o • e
b
o q
1
5
\ r 6b
-
20
F in d t h e v a l u e o f
b)
.
00 5 7
So l u t i o n :
\
-
O
•
e
c
\ n Jw
4
b l
s
2
S
b , q
q
r
t
m
_
u ll
o 8
.
O
q
,
q q5 1
t
b
.
C)
P
e
h
o
o f
F in d th e v a l u e
.
N
Zb
q
4
ch e c k \ 4 1 4
, ’
V
"
HL
m
w
b
c
a
3Mt
q
t
f
s
20
.
0 17
So l u t i o n :
’
a
O • q
1
qoo
i
pa t
-
M
\\
w
.
c h aa s t
,
A
Cl esed n w n b
ar
(
q
s dJ
\ i ii w
-
d ) Fi n d t h e v a l u e o f E) o 33
7
.
Sq l u t i o n :
b
•
310 0
一
-
.
-
60
’
l
;
i ri j j i : M
_
_
i
-
:
_
_
-
Scanned by CamScanner
j
t
Scanned by CamScanner
Scanned by CamScanner
tw m p h ic P N H Cw
I n a p h t rt
p 13 4 :
.
\hc
.
\ c ln
p
in
!
1i f n c
u ¢
d¢
z \ ce¡ n d
\\ l O t
\ a t i {m
a}
p
r \ \tu
h 1l n
t h
!
. \ t
i t
w
1
10 3 5 - cnd\ t uJc \ c l oponc u:
A t r 1o » t
.
P¢ .
•
S
•
.
r in t\
,
n t.:
l l , \ , k«l up, na’
Z8 w = \ H \ u \
. \ 1 \ L
I J
\ !. ¡ n
t
l
. 1 r
I
L
l l t kc
. 1
.
0
p s t«
4
Pt
•
\
<
.
< 1
«
-
: (
d) A n w vh c re f ro m
T he o r em )
-
-
k «
k (T
=
,
0
.
QC
.
.
_
•
oo
q
Q 5
&3 )
.
-
.
.
3 3 )
00 to
10
w
.
. m m
. a \ 1 A
w
!
56 s e c o n d s t o d e v e l o p o n e o f t h e p r i n t s
’
(by
u s in g C h c b y sh ev
5
¢
m
Acco f n l
1
1 0
x
w
Pt
=
o
r t 1 A<)
\
)
\o • w
1
•
•
.
.
*
1 < )
-
Q N
10 0 0 t o 1 0 50 s e c o n d s t o d e v e l o p o n c o f t h e p r i n t s
\
O
-
.
\
d1* W
) +w o
r
s 1 31 )
0
t 11c p n n t \ :
巡
か
い
’
A n!w tw r e fm m
10
e)
p
Bo
t
o
c)
tite
1 in J
.
t 1l
\o
<
l o
.
¢uoeun
W
C
-
1
<
m
4
u p
•
k (r
)
-
i
d
F o r w h ic h v a l u e i s t h e p r o b a b i l i t y o
.
95 t h a t
Mæk
ex c eed ed b y th e tim e
. ta k es t o d e v e lo p
o n e o f th e p r in ts
Scanned by CamScanner
r 1 a m p 1e
t r
.
¢Lr j
l m per\ m \
v tr l
j
一
To q u a l i fy
fo r
a
p o l ice acad e m y ,
A ssu m i n g th a t th e te st sc o re X
a = 25,
X
0
1
一
c
a
n
o
t
=
1
2 0 0
cr
-
1
二
5
二
二
と
.
一
d id a t e s m u s t s c o r e i n
is n o rm al l
fi n d t h e l o w e s t p o s s i b l e s c o r e t o
hl (
•
ー
y d is t r i b u t e d
q ua l ify
th c
¢n p
10 %
h a v in g n m e a n
IB
f o r th c & )lic e ac a d e m
y
o n
n
cncml n h i l i t i c s t e s t
2 o o a n d n s tn n
.
a r d d e v i a t i cm
.
l
t
˘
2 5
N ow
J
\
e &
L
•
( z
u
w 4 =
l
.
g
b q
u o 15
_
28
2 5
A
2 o 0
-
.
o o
•
t
3
1
j
B
=
1
3
2
Z
r ao
77
i »
W
a r t
cd \
.
L
Scanned by CamScanner
Scanned by CamScanner
t5
n \ s ’
h
t (
lw
q
8
•
F o
\
J
n
+
•
5
X
.
n
Z
p
¥u
=
n
)
c L
g?
6 b m
a
R
-
+
-
’
0
0
<
<
t
b
.
5
3
d
y
<. o
3
o
a
ttA
-
J;
n
P( a
-
5
.
0
b \n o m l a 1
p
)
5l p
Wa s o o r r & l
9l
.
C 二二 Rン
-
P C 天之 灵 1
-
く广
瓯
(배
心ム
ド
\n
c e t
マリ; ン a )
t
a ˘
t h
w
c
tw
w
b
•
女 O
•
j
)
6
» l
t ( 久く
1 o
口
c 汽 洳
•
及
オ
凸
•
S
S
Scanned by CamScanner
Scanned by CamScanner
Scanned by CamScanner
l e r
6 Sa m p j i n g D
n p \ c
w
o m
s t 1 b u l i o 11s
9/
S
2) _ a m p l e
S u b se t o f a p o p u l a t i o n
3) R a n d m
Sa m
-
A
su b se t
sam e p r o b a b i l it y
A
N
1 ,
し
.
’
"
.
.
.
.
.
.
X .. Is
,
a
ra n d o m
o f
s a m p le
n
s iz e
N
c
th at eac h o f th e
io m
f in ite
a
s a m p le s h a s
p o ss ib le
.
t
t h e
BPU1aj \
.
n
n
I n fin i te P o p u la tio n
Xz
.
.
.
. . . . .
X . is
,
sa m p le
ra n d o m
a
in fi n ite
th e
fro m
,
a
c h
l
•
x
X
,
z
.
. ’
.
.
,
x
\ n
( x ) if
Xi Xz
4) L e t
.
.
f be i n g s e l e c t e d
o
.
o b ser v at io n s X
of
po p u l a t i o n
E
Xz
Fr o m
su b se t
h
Lk
.
i f i t i s c h o se n i n s u c h w a
y
,
N
X
-
b) -
2
c1
ra 1 r a w n F r o m EEF. mE1at i on
size
po p u l a t i o n o f
s c ,m
o ne (
o b se rv at io n s
of
$ rB
o H e
rm
w
a)
敦 如 m
h\ w4a
S am p les
S e t o f a 1l p o s s i b l e o b s e r v a t i o n s
p Fp u l a t i o n
n
a n d om
W
上
占
Po p u l a t i o n s a n d
c
.
"
.
.
.
.
.
X n a re in d e p e n d e n t ra n d o m v a ria b le s
,
i st r i bu t i on
ha s ad
. .
.
.
.
.
.
.
.
.
.
N be a
X
,
(
gi ve n b y
x) .
N
fi n ite p o p u lat io n o f si z e
t
,
he n
N
p op u la
a)
on M ean
Exi
J1 -
=
.
i= l
N
N
1E
z
b) po p u l a ti o n v a r i a n c e -
_
c T
(x i
p )
-
2
z
o R
cT
.
-
J
N
9
z
i= 1
5)
Let
X
1Xz
,
.
.
.
’
"
.
.
.
.
.
.
X . b e a ra n d o m sa m p le o f s iz e n
,
1
a
) Sa m p l e M e a n
-
-
n
¢
b ) Sa m p
i)
How
siz e N
le V a r ia n c e
m any
=
=
d if fe ren t
5
’
1
•
1
2 .
(X ,
of
sa m p le s
t
siz e
n
•
)
-
Z
2
0 R
5
2 .
N
can
be
d raw n
* om
a
(n
t n ite
-
1)
p o pu l
atio n
o r
r \ u
f e
i i ) w ha t i s t h e p r o b a b i l i t y o
.
he n
6?
C 2
1
t
.
L
1-
,
-
le?
a ch p o ss ib l e sa m p
L
66
\5
Scanned by CamScanner
Scanned by CamScanner
s&
sam p@
˜
_
m m e a n 1_
x
+
ra n d o m l y d r a w n f r o m
T he o r e m
If a ra n d o m
Z
v arianc e cT
1)
th e sa m e
,
t
p o p u la t io n ,
s am p le o f s iz e
n
-
p j U
/1
-
N
˛
,
sa.
p 1. s o f
p l in g d istri b u t io n o f
p o p u l a t io n
h av in g
X
’ "
,
the m ean
and
p
-
,
-
the
b u tio n h as
’
r
cn d
U
Z
H« p
k } »
p o p u la ti o n c o rr ec t io n f ac to r
e
e
L
b
’
.
8o l
.
t» t
Lci \\
l in i t e p o p u l a t i o n o f
•
,
s"
u m
uut on 6
\ ar
on
i
n
B e t
in f i n ite p o p u la t io n
is c a l le d t h e f i n i te
1
-
£ h
1e s i . .
n
-
w h ere
g
o f
-
n
T
pu t e d f r o m
e
fin ite p o p u l a t io n o f s i z e N
’
N
a
m
=
cr
N
o
l
s
-
’
i vj
cr
cr
n
•
the v a r i a n c e
a
c o n t c\ \ o n
’ "
\
Z
,
is tak en f ro m
n A A
(r
c
is c a l le d t h e sa m
X is a r a n d o m v a r ia b l e w h o se d is t r i
he n
th e m e a n
2)
X
p o s s i b l e v a 1u e s o f
˜
.
.
T h e d istr ib u t io n o f a l l
D e f u 1i t i o n
-
not
屋
斟 口n ん
Fin d t h e v a lu e o f t h e f i n i t e p o p u l
g
.
N
N
-
h
-
o
l b
o
.
.
.
a
o
-
Ex c 6 m .
I
_
•
W he n w e s a m p l e f r o m
In creased f o m
5 0
to
2 0 0 ;
n
o
’
h
c
.
j o
/
c o r r e ’c t ’i o "n f a ’c ’t "o r f o r
n:
n
=
10 0 a n d
a n i n f 1n i t e p o p u l a t i o n ,
\ -
fy
m
8 m
Qg o
’
m
b) D e c r e a s e d f r o m
2 2 5
to
2 5
2
2
-
ha t h a p p e n s t o t h e s t a n d a r d e r r o r
w
1
ecr ease & b
ro f
N
j 2 eS
1
\
o f th e m ean if th e sa m p l e s iz e is
a)
POP
.
d le u , ’ \ o n
3 \w n
凸5
.
1
s m
S
lt
,
S m
l m
t nce<
e
’
n
t o
z
e
S
m
.
址 色
S +o n 山) r 度 铛 r e p 锂 c r e o
,s
谦
一
s Am
毒 手
dm
4
一
1 Uo
际
。
’
.
1 s
\ n
、
。
土
c r e $
67
Scanned by CamScanner
( e l d
Ex a m p l e
s u p p o se
a
po p u latio n
dist r i b u t i o n o f
c o n sist s
b ased o n sam
o f
th e
f o l lo w in
g
p le s o f s iz e
2
2
,
4 6 8
,
,
.
c o n st ru c t
se le c te d w it h o u
t rep lacem en t
v ar ia n c e o f th e sa m p l in g d i str i b u t io n o f
th e m ean
d
v alues
.
the
sa m p l in g
Fi n d t h e m e a n a n d t h e
.
.
"
-
1
v
i
u
r
1
prc m e a n
.
r
’
is a r a n d o m
T
h
e
Ed
sa m p
)
l
=
i ng
p
di
v a riab le
s t r i bu t
-
i on .
X
f
o
i
s
d
)
.
’
一
ノ
一
一
一
Scanned by CamScanner/<B
.c
:
i
a rL t A
.
T h e
v ar ia n c e
or
.
c
ld
r
:
’
,
.
.
,
Scanned by CamScanner
-
-
c
q
p
G iv e n th e i n f i n i t e W
.
p u l a t i o n w h o s e d i s t r ib u t i o n i s
g iv en by
j
f (x
a)
F i n d th
)
\
0 25
0 25
.
0 25
.
.
ean 1 and th e
/
p o p u latio n v ar ian c e c r
e p o p u l a t io n m
4
b) D r a w
2
.
3
!1
旧 自封团团!
2
16 s a m p l e s ( w i t h r e p l a c e m e n t ) o f s i z e n • 2
.
-
/
Z
d)
V eD fy th at P
-
/1 "
d
=
,
Scanned by CamScanner
is t h e v a l u e o f s t a n d a r d
-
-
_
.
.
le s s t h a n i
a)
n o m i a l d is t r
ib u t io
.
_
’
’
n as
"
n
"
oo
.
"
"
2 I> w e u s e
abo u t th e
.
T he c c n tr a l l
.
Im
E Br o •
t T h eo 【
e m
•
\ f
"
c
» \
-
h
, J
p r o b ab i l ity th "
’
"
( 4
1
w ill bc
w
l
w
.
1
. i
-
P(
ø 1N )
< Z s )
? S< t
-
-
.
Ø
=
0
.
Qq 38
o
t im e a t th e c o u n te r
ra n d o m
fr o m
v ar ia b le h a v in g
p
th e t im es
m ea n
a)
fo r
a
ra n d o m
w i ll b e b e tw e e n
T hc C m
17 6
-
1 7
二
0
• o
e
L
2
1 bL
L \ A )
心勺
叼8 1 之
f o r a c u sto m e r to b e se rv ed at a
p o s t o f fi c e c a n b e m o d e l ed a s a
z
sec o n d s an d cr
sa m p le o f
54
-
t 1. t r
d 17 8
10 0
_
2 56 T h e s a m p l e m e a n
w i l l b e o b t ai n ed
.
c u sto m e rs
sec o n d s :
•
.
W ha t
\1
l
r
is th e p ro b a b ility
th a t th e
m
;
2 9 6
tr a l L i m i t T h c o r e m
h 1 o o
b) C h e b y s h e v
t
& r
c«of
> t
’
s
T heo r e m
\b
n
m
b;
.
0
b 9
L
-
s h e \J
x
p
r
1
m
T iT I
\
•
"
=
L
L
k
=
k
p t n s 1 < R & )
’
-
Ti /
’
14 8
71
\t
\1
l
Scanned by CamScanner
W
"
P
1) m
a mr æl
If
is t h e m e a n
_
o f a ran d o m
’
rn e a n
m d . . ’ "
p
ha v i n g t h e t d
-
"
"
,
a n d
sam
s
p le y
size
n d ard
n o rm a l
i]gs -
F
cr
Mo w F )
( n
<
3 0
) tak e n
» om
"
-
.
d i s t Fi b u t i o n
v
=
n
p ro v id es
"
t
f
1 de g r e e o f f r e e d o m
-
a
good
p o p u la t io n
h av ing
,"
"
th e
t
"
"
i"
"
d is t r i b u t i o n
fo r
.
a p p ro x i m a t i o n
to
-
A
ko deg rees o f freed o m
’" "
.
T h e p ro b ab il it ies ar e in sid e
-
m
a no rm al
z
ist r i b u t io n w it h t h e p a r a m e te r
o t e T he s t a
X&
Q< m
-
1
-
2
-
\
0
1
2
u 1i o n s
1) A l t h o u g h t h e r e i s o n l y o n e Z d i s t r i b u t i o n h e r e a r e m a n y
y t d i s t r i b u t i o n s I n f Bc t . T h e r e i s a
d i r fe r e n t t d i s t r i b u t i o n f o r e a c h s a m p l e s i z e u s e d T h e w a y w e d i s t i n g u i s h b e t w e e n v a r i o u s t
,
t
,
m
a n
.
.
d is t r i b u t i o n s i s b y
fi n d in g th e d e g re e s o f f r e e d o m
th e o n e s a m p l e c as e , t h e de g r e e s o f f r e e d o m
2 ) T he s h a p e o f e a c h t d i s t r i b u t i o n
th e m e a n ( c e n t e r ) i s 0
i s v e ry
(d f ) th at co rresp o n d to th e sam p le size
a re th e sa m p le s iz e m in u s o n e
sim ilar to th e Z
.
=
n
-
1
T he s h a p e i s b e l l
.
Fo r
.
s
ha p e d
.
3 ) Th e t a i l s o f t h e t d i s t r i b u t i o n s d e c r e a s e m o r e s l o w l y
-
T he t d i s t r i b u t i o n s a r e m o r e s p r e a d o u t t h a n t h e n o r m a l
-
d istr ib u t io n
d f
th an
th e ta i ls o f th e n o rm a l
d istr ib u t io n
.
.
72
Scanned by CamScanner
Scanned by CamScanner
Scanned by CamScanner
-
mm! g
a n d
t hei r ps
Fo r m u l a
U w
Z .
X
/I
-
Z _
c r
t =
X
U sed
to
p o p u <a t i o n
cr
l /|
g a in
i n fo r m a t i o n
th e v a r i a b l e
i5 n o rm a l l
,
-
5 /
J1
sa m p le s iz e is n
U
s e d
to
abo ut
a
r a n d o rn
d istr ib u ted
ni
ni t c
1x ) p u l a t i o n ) o r
le
m
w
v a r ia h lc
o b ta i n e d
f mm
the
.
g a i n
3 0
y
w h en
th e
ra nd o m
.
i n fo n n a t io n
a
s a m
p
e a n
d is t r i b u t e d w i t h u n k n o w n v a r i a n c e a n d t h e r a n d
h e n
o m
t h e
v a r i a b le
sa m p le s iz e is
n
is
n o r m
<
3 0
a l l
y
.
Scanned by CamScanner
-
i n f e r e n c e s @r n c e r n ˜
S里 回 国 P o i n t E s t i m
Po i n t
sa m
e st i m a t io n
p le d a ta
g˘ o n
conc er ns
fo r w h ic h
w e
X1 wn
th e
c h o o sin
g
o f
a
stat ist ic ,
h a v e so m e ex e c tat io n
,
p
pa r a m e t e r i t i s su p p o se d t o e st i m a t e
t e
‹
o
r
t
a
c L
u
ha t
s s u
is,
r a
n
c
Fm˘
a
e
t
,
n s
( . w. h bs Quo _<ae
s in
g le n u m b e r c a lc u l a t e d f r o m
ha t i t i s r e a s o n a b l y c l o s e t o t h e
.
p o i n t Emt i o n Me a n
1
Pa r a m e t e r
Da ta
A
P o p u la tio n m e a n
ra n d o m sa m
p le
Es t i m a t o r
X
S a m p le m ea n
,
.
/ 1
.
Xz
茎豸 H 山 川 E r r o r 살
T he m a x i m u m
To
e st im a te
\h e
E
-
X.
.
S
•
TT
嗵亟
K 、
蜀
e r ro r o f e st i m a te
X is g iv e n b y
by
p
w it h t h e m ea n o f a ra n d o m
p
IX
. .
je
Est i m a te o f S t a n d a r d E r r o r
•
.
-
p lw M
b e al m o st
k
l , mhs un b ¢ o
P
,
m
w
?
s a m p te
h ere
k
r e
\ -
’
¸i #
it
w
,
/x
-
E
笞
e
c a n
ヒ
-
f
p /
a s s e r t
w
i t h
r o b a
p
b i l ity 1
-
a
th a t
\s
k( . o r
wM ‹ Wf
r
\
w
i
D! -
Siz e
mm
-
E
=
cr
Z a lz •
’
L】
ro u n d u p to th e n ear est in te g e r
.
W ha t i s t h e m a x i m u m
-
e rro r o n e c a n ex p ec t to m a k e w ith
p ro b a b il ity
0
.
90 w h e n u s i n g
2
= >
E
=
Z. /2 ’
1 ‹tt l
.
’
l 0 05 .
q
-
ll 6 4 5)
.
.
.
0
.
\ &G
:
z9
:
Scanned by CamScanner
,
:
-
.
.
Scanned by CamScanner
B
8
7
.
.
2: I n t e r v a l E st im a t io n
C o n f i d e n c e
l n t e r v a 1 :o r
p
1
cT is k n o w n
C ]t f o r / 1 i s
C l
乙
.
.
: or
p
万千 E
1 ‹
七
一
1
.
。 .
fo r
P
万千 E
矢
r
一
.
(n « 3 0 )
is
卫<
/1 ‹
x "
e
1
cr is u n k n o w n
C I
is
/1 任
。
E < >k
o r
V e 1
unknown( n30 !
¡r is
\
_
(C I )
1
l
I ni ws l
;
。
E
条
。
Es mp 7
A ran d o m
sa m p le o f si z e
je
m ean is
21 6
.
.
,
c o
n
s t
100 i s t a k e n f m m a p o p u l a t i o n w i t h c r . 5 1 G i v e n t h a t t h e s a m p l e
=
n
.
m
i s % c o n fid e n c e in te rv a l fo r th e tru e p o p u la tio n m ea n p ?
r r 9
l yt i qe ;
n
1
Cr
•
o r
?
p
\
5 1 (k n o w n )
-
j
/
10 0
-
G
.
*
_
ßh
o N
W
D L
c . .
.
飞
21 6
.
.
a
-
-
0 95
a
.
-
1
0 95
-
.
=
0
˘
0 05
.
05
-
_
.
0 025
.
2
2
Z o o z s - 1 96
.
.
r +c 1
CI fo r
A 95 %
is g iv e n b y
P
I
.
卫
5 ?
C
.
1 ? ¢u ) t
o
M in a t ‹ i r mr
ゴ
\) m u k
.
Pt
21 6
Z o o25
•
z1 6 <
( 96 )
.
.
.
.
.
a
p ‹
q 5
(Z1 6
.
•
{
-
.
cl
f o r
l i 00
,
.
o
’
.
00
C £ J\\
.
t
’
.
_
E
< «
e
(
’"
"
5 1
F
0 9996 2 1 6 + 0 9996 )
.
T
.
2 1 6 F 0 9 99 6
.
¡
)
Scanned by CamScanner
Ex a m p l e
m
ri n g s m ad e
de v ia t io n o f
n o rm al
0
.
by
a
00 40 c m
p o p u la t io n
.
( n ; poet o
n )
p(
ce rtain
A s s u m in g
.
Co n s t r u c t
a
0
50 60
cm
m ean
d ia m ete r
o f
th a t t h e d a t a m a y
b e lo o k ed
u p o n a s a r a r 1d o m
p ro c ess h av e
9 5 %
a
in te rv a l
c o n :i d e n c e
fo r
th e
.
w it h a
sa m p le
a v e ra g e
a c tu a l
st a n d a r d
f r o +n
d ia m e t e r
a
o f
be a r i n g s m a d e b y t h i s p r o c e s s i
n
"
1o ( < 3 0 )
=
=
X
•
O
•
n
z
s
0 50 6 0
-
.
S - 0 0 04 0 ( ( r u n k n o w n )
.
个
1
v
a
-
=
=
0 95
1 - 10
-
n
a
.
)
A 95 %
CI fo r
-
0 95 - 0 05
-
.
.
=
-
"
’
0 0 Z5
=
.
1= 9
-
¢a /z 1
[
.
1
-
qo oz 5 )
.
2 26 2
-
.
, 9
n b y
/ 1 is Bl v e
S
X F ta Z’
0 00 40
.
0 5 0 6 0 < t (o o 2s ) •
.
.
= >
/
1 ‹
(0 5 0 6 0
-
0 50 6 0
0 0 0 2 86
.
.
.
J IM
.
0 0 0 2 8 6 , 0 5 06 0 + 0 0 0 2
.
.
.
仁26 2 )
.
p ‹
0 0 0 40
o 5060 不
.
JI M
, a
.
삐
(0 5 0 0 5 0 8 9 )
.
,
.
78
Scanned by CamScanner
Scanned by CamScanner
Scanned by CamScanner
Scanned by CamScanner
Se c , 日
日日1
A
.
EY !
g n d T ests g 9 t
_
.
A hy po t h e s is m , a n s a c l a i m
T
.
h e
al r en u u i
T h c
n u ll h y p o th e s is
ve
hy
p o t he s i s (
1i n
heses
-
(
] F i ncl
•
.
>
\
)
.
,
)
H
) i s t hc
is th e n c g ˜
cl ai m wc
wi
sh 1o es t ab l i sh .
o n o : th c c M m
.
(
A
m a n u f a c m r e r c l a i m s l h a t t l 1c 1T 1c n d
a
ry in g l im e o f h is n c w
p a i n t is
p
.
ZO m i n u t e s H c d e c i d e d
.
^d s q gu
W
c
p
e
r f or m
t es t
t o
d e c i de
wh
e t he r
1o
Hn
p
H\
p > 20
ac c e p
t
or
-
20
r ej
ec t 1 l o.
T
h e er r or s wc
ma k e
ba s e d
on
ou r
de c i s i o n a r e
;
l
l
.’ ’
"
I
P
_
Y
’
\
m
W
Delin itio n s
a
P R ype . E r r o r )
=
P { r e je c t H o w h e n H o i s l r u e )
-
ev el
L
=
of
Si gn i f i ca n c e
P ( Ty p e u E r m r )
-
P fa c c ep t H o w h e n H o i s f a lse )
-
P ( a c c e p t H n w h e n H , i s tr u e )
Bl
Scanned by CamScanner
Scanned by CamScanner
县墨列国卫妞
Su p e
Fø.
\
Th a t
fo r
a
g iv e n
p o p u la t io n er
-
8 4
.
.
We
w ant
to
test
H
.
-
p - 70 5
.
on
j Y< 7 3
j
r e e c te d i f
the
b a sis
.
R. d o m s a m p l e ’ " .
"
1 0 0
.
"
"
o :
-
p
. . ’"
一
,
Fi n d
l
+
T
b ) T he p r o b a b i l i t y o f a T y p e I I e r m r
.
b
wspct cl
I
.
r
75
ag a in st
:,
" h . .
了
3
S Q! w
a
P {T y pe 1 E r r o r )
-
-
F ( 2 38 )
一
0 勇0 8 7
.
r
"
-
.
P
=
P {T y p e I I E r m r )
P (acc e &
-
wbeni l se )
H o
_
芽
..
、、
)
P( Z
1 p ( Z « 2 976 )
1 F (z 9 8 )
2 9 76
-
.
-
-
-
.
-
.
0 9986
-
1
-
0 0 0 14
-
.
.
83
Scanned by CamScanner
a
h e s i s
H y po t h e s is
l1
T estin e c o n -
O n e M ea n
cr is k n o w n
cr
n
i s u nk n ow n .
30
(r
ls u n k n o w n
T est S ta t isti c
T est S ta tisti c
T est S ta tjs
臣西园
R ej e c t i o n R e g i o n
R e je c t i o n R e g i o n
R e ection
i
R
jec t
or
Z
<
H
. a1
&
o a t l ev el
>
a
if
Z. / 2
j
R e ec t
o r
Z
0
.
a t l ev e i a
1
N
<
ir
o r
’
c a1
>
’
a l z
•
. ;
&
0 ’
QL < s
e)
J
0
p - po
H
p
T e s t S t a t is t i c
T e st S t a t i st i c
R
je c t i o n R e g i o n
R e ec t io n R eg i o n
W
eet
H
Z
< p
o
o
ca 1
a t 1e v e 1 a
j
if
R
j ec t
Z.
-
<
T est S ta ti sti c
0
"
Z
B1
j
R e ec tio n R eg io n
a t l ev e l
<
-
a
i r
l
Z.
T es t S ta ti s t i c
T est S ta tist ic
R e je c t i o n R e g i o n
R e e c ti o n R eg i o n
R
0 P
-
Po
P > P o
j
ect
0
Z c al
at lev ei a
I
>
Z
.
I R e je c t
0
R
a t lev el a
Z cal >
-
n
a t lev el
cal
a
if
a t l ev el a
if
-
<
t.
•
1
-
T est S t a tistic
j
if
0
R e j ec t
v
H 1
召
一
\ ; -
13t a o
1f
•
-
e
30
c
R t gion
j
R e je c t H
o a t lev el a
Za l2
>
.
Z
if
jec t i o n R e g i o n
0
R ej ec t
I
.
v
-
n
-
t al
>
y
1
84
Scanned by CamScanner
一
Scanned by CamScanner
E x a n 1p l e :
A c c o rd in g
@
to
th e n o rm s es
ta b l ish ed
sh o u ld a v e ra
ge
a v era
7
the 0
ged 7 6 .
.
7 3
t e
,
.
s t
0 1 le v e l o f s i
fo r
a m e c h a n ic a l a t i t u d e
p
2 w i t h a s ta n d a r d d e v ia t i o n
t
h
g n i
nu! F_hesi s p
Dc a n c e
te st,
pe r s o n s w h o
are
18
y ears
o ld
o f 8 6
1r 4 5 r a n d o m l y s e l e c t e d p e r s o n s o f t h a t a g e
73 2 a g a i n s t t h e al t e r nat i v c h y p o t h e s i s p > 7 3 2 a t
-
.
.
.
.
.
Sq l u t i o n
1)
H y po t h es is
2)
H
p
H1
p > 73
=
73 2
,
.
Z m D
M ˙ \
X _ 76 7
.
n
-
45
a
-
0 01
.
3) T e s t S t a t i s t i c
乎 气若쓿 多
Z一
4) -
一
一
요 뉴
n R e io n
g
R j ec t
H
o
a t l ev e l a
-
0 0 1 if
Z.
.
.
Z
Z 0 0 1 - Z 33
.
.
5) D e c i s i o n
Si n c e
Hen ce r
2
,
73 > 2 33
.
je c t H o a t l e v e l a
=
0 01
.
.
;
85
•
.
.
Scanned by CamScanner
e xa m p le
A
ra n d o m
sa m p le
o f
6
ste e l
b ea m s
h as
sq u a r e in c h ) w ith a s ta n d a
r d d e v i a t io n o f 6 4 8
˘
-
p s i,
u
s e
st re n g t h
his i n :b r m a t i o n
t
o f
5 8 3 9 2
p
si
( Po
v e l o f s ig
a n d th e le
0 0 5 to t e st w h e t h e r t h e t r u c a v e ra g e c o m p r e ss iv e s t re n g t h o f th e s t e e l
fro m
w h ic h
u n d
p
er
n ificance
lc
th is sa n l p
.
ca m e is 5 8 0 0 0
1)
c o m p ressiv c
m ea n
a
psi
.
A ss u m e n o m i a l ity
.
H y po t h es is
0 P
2)
n
=
6 (< 3 0 )
X
•
58 39 2
-
5 8 0 00
58000
H1
p *
/ 1n
5 8 3 9 2
S - 648 ( ( r u n k n o w n )
a
0 05
-
.
3) T e s t S t a t i s t i c
-
-
58 0 0 0 .
1 48 2
.
4) R j t d i o n R e g i o n
R e jec t
H
a t l ev e l a
o
1= 6
-
=
v
-
n
.
二
-
’ t al <
0 0 5 if
.
-
ia / z
o r
’
c1l
>
/ z
w i th
V
-
-
n
1
l = 5
0 0 25
.
2
2
5) D e c i s i o n
Si n c e
H en c e
-
2 57 1 < 1 482
.
< 2
.
57 t
,
a cc e p t
H o a t 1e v e l a
-
0 05
,
.
Scanned by CamScanner
Ex a m p le
1 4 70 7 a n d
35 t ra c t io n m o to r s A c o m p u te r c a lc u la tio n g iv e s X
f hy po t h e s e s w i t h
S 0 5 23 5 t h o u s a n d d o l l a r s A t t h e 0 0 5 l e v e l o f s i g n i li c a n c e
th e i n te n t o s h o w in g t h e m e a n i s re a te r t h a n 1 3 tho u sa n d d o l la r s
g
Fo r t h e c o s t o f r e b u i l d i n g
-
n
_
-
.
.
,
.
.
c
o
n
d
u
c
t
a
t e s t
.
o
.
.
So l u .
I)
2)
H y po t h esis
n
=
35 (2 3 0 )
X
.
1 4 70 7
S
=
0 5 23 5 ( ( T u n k n o w n )
a
=
0 05
1 3
Ho
p
H\
p > 1
-
.
.
3
.
.
.
3) T e s t S t a t i s k e
po
-
L
-
eal
1 4 70 7
.
-
13
.
-
-
’
.
0 523 5/ l 3 5
51
.
4) R e j e c t i o n R e g i o n
R ej e c t
t lev el a
o a
H
0 05 i f Z .
-
.
t
>
Z.
1 64 + 1 65
.
.
Z o 05 -
-
1
-
.
.
ßq a
5) D e c i s i o n
Si n c e
1
,
93 > 1 6 45
H e n c e r e je c t
.
H
o
a t lev el a
=
0 05
.
.
87
Scanned by CamScanner
ln
1 2
te s t ru n s o v e r a
1)
0
.
2
.
3
seco n d s
t
a n o rm a l p o p u la
sa m p l e f r o m
at thc
o f
d e v ia tio n
st a n d a r d
c o u rse .
n ia rk cd
io n .
n
e
w
ly d e s i g n e d
A ssu m in g
.
T e
a
s
t
tha t
it
is
m o to rh o at a v en
reaso nah le
th c n u l l h y p o t h e s i s
P
to
g ed
3 3
treat
th c
.
6 sec o n
d a ta
as
s w ith a
a
3 5 a g a i n s t t h c al t cmat i vc
-
ra nd o m
P < 35
’
0 5 le v e l o f s i g n i f i c a n c e
H y po t h e s i s
2)
n
12 ( <
-
X
Ho
p
H t
p
-
35
< 3 5
30 )
33 6
-
.
S - 2 3 (cr u n k n o w n )
.
˘
0 05
-
.
3) T e s t S t a t i s t i c
4) R e j e c t i o n R e g i o n
R e je c t
65
0
a t l ev el a
=
0 05 ir
t eal <
.
-
ta
w i t h
v
-
n
-
1
)
Si n c e
H en ce
-
2 10 9 « 9 1 79 6
.
j
r e ect
.
H
o a t lev el a
=
0 05
.
.
88
Scanned by CamScanner
s
T hr
m
@ T t rf o r
Rr l anmnmeen mr r n] C o l 1l ¢i e n R i -
q
m
T hc a c e c p t a n c e n g i t ) n o r t h c l e s t
H*
(1
is t h e
a)
1l t r
is kn o w n
A ce c pt
H
b) I : c r
c)
1\
*
ir {r
H
a
\f
o M
a
H
o
at
3 0 )
\f
Bl #
Ho
.
E X +
-
)
,
.
Hete
[
E
Z
•
•
a 11
.
H o e
3 0 )
\f
a
cx
I 11 ‹
is u n k no w n ( n <
A c c ep t
H\
.
.
is u n kn ow n ( n |
Acecp t
v s
1Bo
=
1 00 % e o n f i d c n e c i n t c n a l l o r p
a
-
p
{X
-
S
E X + E)
. Here
E
[
Z
E X +
.
E
Z
t
,
•
. tz
•
.
p o ‹
(X
-
E
,
S
)
H et e
a lz
•
TT
•
Ex a m p le
X
If
n
a)
F in d a 9 5 %
16
=
.
3 42
.
.
S - 0 68
.
,
.
c o n fi d en c e in te rv a l f o r
p
?
So l u t i o n
n
=
16 ( < 3 0 )
X
.
3 42
.
S . 0 68 (cr u n k n o w n )
.
1
a
-
=
0 95
a
.
1
•
a
0 95 - 0 0 5
-
.
0
-
•
2
v
-
n
-
A 95 %
1 - 16
05
.
"
’
.
0 0 25
.
2
1 - 15
-
C I fo r
is g i v e n b y
p
S
又 不 t a /z 1
石
0 68
.
3 42
.
t o oz
(
.
3 42 .
.
,
)
1 5
(2 13 1)
.
•
0 .
68
.
3 42 < 0 3 62 3
.
J1 ‹
(3 4 2
p ‹
(3 0 5 7 7 3 78 2 3 )
.
.
-
.
0 3 6 23 3 4 2 + 0 36 23
.
,
,
.
.
)
.
89
Scanned by CamScanner
b) T e st th e h y p o th e s is
Hoi
at a
3 7
B1
Vs
.
H \
.
•
.
P+ 3 1
.
0 05 ?
•
.
So l u t i o n
Sin c e a
3 .
an d
C I
9 5 %
/1
(3 0 5 7 7 3 7 8 Z3 )
is
.
.
,
(3 0 5 7 7 3 7 8 2 3 )
7‹
.
So w e a c c e p t
c)
fo r
H
.
,
o
at
0 05
=
a
.
.
T e st t h e h y p o t h e s i s
H o
Sin c e a
an d
3 0
Vs
.
.
H 1
P + 3
.
0
.
9 5 %
3
-
0 05 ?
-
at a
p
.
0¢
So w e r e j e c t
C I
fo r
(3 0 5 7 7 3 7 8 2 3 )
is
I
.
,
.
(3 0 577 3 78 2 3 )
.
H
.
,
o
at
a
-
0 05
.
.
90
Scanned by CamScanner
k l p n ma u S i m p l e gzh m = T h e o d i
S
u
p
s e
p o
a
r an d o m
re la ted to
. T
v a r
i ab l
m n
e
c a n b e p r ed i ct ed i n t en n s
Y
‹
t i ma
t
t
f Y i s l i ne a r l y
S t1q
=
«
PX + ‹
+
(E )
•
t
o
eo
r
p
e d i
r
ct
\{
T h t n
\
Px
+
a
wh e r e
by
Y
=
_
a
+
bx
’
.
’
b
w h ere
,
i-
4
=
t
u
Q
M u1d
)
5
龊 J*
bX
-
4
j
.
. d
-
-
n
1
’
l
1
.
n
i=
4
¡
.
.
。
i=
Se c
1
主
=
1
。
主
。
i
I 1 6= 1 m c o r r e l a t i o n
-
1
C o & i m ie n t
.
t b in a
W e c a n m e as u r e t h e st r en g th o f th e r e l a t io n s h i
r
s
l1 o
p b e tw e en
=
,
&l s r t t o n ; e b a e e n
w
X
a n d
Y
l 5 r [
l
k &
d
u sin g
’
Sj
w h ere
与
l .1
J
-
w
.
y
-
コニ丁
al s
-
A
.
H Jo d M
p lc t c L
&
’
l
A r o u J; o l b «
-
W
e r
=.
J i & r ¢ w c>
.
z
¸ (Y ) x )
s
v a l ue x ,
a f i xe d
is th c
A ssu m e E
E
of
he n
t
Y
w h e re
Ree r ess io r1
t
u (
-
91
Scanned by CamScanner
.
1
-
r
l r
he n
T
.
X
and
Y
a re pc r fe c t l
y
po s i t i v e l
y
,
’
1
f
r
-
=
.
1
T h
.n
£
on d
X
Y
or e p« f r d l j
t
p
c1
la tc d
n
a
«
O
«r
< l
.
Th
en
Y
i sp
o s i t i vc l y r el at ed
to
9
沁
j
S l ee
-
I -
o
卤
41
Cp « k
I
\
1
B rc l .
h ve l g r e lo
ot
e
.
r .
•
XU
自如
u
\
J 1u *
X.
U
A
˘
f
’
H r o
«r
l
i -
< 0
.
T h
en
Y
i s ne g t i ve l y
a
rl a t ed
to
X.
r
r
•
0
.
T h
en
Y
i s no t
l i nc a r l y
re t a t
to X
or
t he r e
i s no
r
ヒ
h \ d
i
<
G r u
ヒ
-
1
v
\.
r el at i on s h i p
he t we
?
en
X
an
乙 \ e \ o <t c q s h
L E
w
W
.
h
h
W
W
h
e n
e n
h e n
e n
t he
t he
t h e
t he
va l ue
v a l ue
v a l u e
va l
ue
of
of
ri
r
o f
of
ne a r +
i s ne a r -
r
r
s
i s
is
1
1
n e a r +
ne a r -
0
,
.
t h
e r e i s a po s i t i ve
T h
e r e i s a ne g a t i ve
r e a l p t op t o n
st r on g
st r on g
l i ne a r
r e l at i on s h i p
.
l i ne a r
r e l at i on s h i p
.
O he r e i s a p o s i t i v e w e a k l i n
e
,
.
e r e i s a ne g a t i ve
we a k
ar relat io n s
h i
l i ne a r
r e l at i on s h i
p
r e .d
A
t
T h
r I
t o rl s h
&
-
¢t o p n o t t
.
p.
92
Scanned by CamScanner
Y
T h e fo llo w in g
Ex a m p l e
jo bs
s t u d ie d
have
d ata
G e rm a n
sh o w
in
th e
h ig h
n u m b er o f
sc h o o l
o r
y e a rs
c o lleg e
t h a t c e r ta in
a n d
th e
a p p l ic a n ts
g ra d e s
th at
in
fo re ig n
th e y
s erv ic e
re c e iv e d
in
a
e n c y te st in th a t la n g u a g e
pro l c i
a)
q
3 24
lL
9 18 4
25
12
l 20
2 6
1 b S C
75
2 26
q
5 6 25
84
l(
r
1 o 5
3
57
4
72
5
89
r s s
5
84
3
2
%
_
F in d th e l e a s t s q u a r e s r eg r e s s i o n l i n e
b ) Pr e d i c t t h e g r a d e o f s t u d e n t w h o s p e n t
c)
C a lc u late
th e
c o rre latio n
his/ h e r g r a d e i n t h e t e s t
\
&
c o e f f ic ien t
>
.
_
3
a
. 8
bx
+
.
5 years stu d y in g G e r m a n
.
b etw ee n
th e
n o
.
o
f ye ars
’
.
a
j \ s u k w’
stud en t
spent
n
Wq
B
"
.
6
1
Y 4
g• ?
m v
stu d y i n g
an d
?
’
\
o + \n d
¢l & b
n e h m
h
t
4 ß
( t
W
c
-
P
o \ n r
M
C
h
>
h
.
h
1
•
-
8
3
9
•
3 q
•
2
o
.
c +
-
+
a G 4
(3 5 )
7 7
.
Scanned by CamScanner
E x £
ma n d
T he f o l l o w i n g t a b l e g i v e s s a m p l e i n f o r m a t i o n o n t h e d e m a n d
its p r ic e ( i n c e n ts ) i n s e v e n d i f fe r e n t m a r k e t
’
s
.
回
. "
I
y
••
• •
•
••
J’
a
r e
国旧国
国 国团团
=
b) E s t i m a t e t h e d e m a n d f o r t h e p r o d u c t w h e n t h e p r i c e i s
2 0
a)
2 57 7
_
.
a
••
w
H in t :
fo r a p ro d u c t ( in t h o u sa n d s
’
=
3 2 79 9
?
F in d t h e le a s t sq u a r e s r e g r e s s i o n l i n e 】
_
a
+
.
bx
-
,
6 793
)
-
r
C a lc u late t h e c o r re la t io n c o e f f i c ie n t
r
c e n ts
-
b
)
C )
r
l
\ 91
-
.
-
j h
o
,
c
s
.
Y
.
5
-
o
L
o
o
e
Jc
.
D
3 2
n
o
.
SOl ut i
=
_
.
•
c)
’
.
•
9
9
Tr Y
l8 I
L
c\ s \
-
-
u e
r w
t
a t i k n
g \ :
p
h ,
b r fi
Z
.
-
.
ヌ˘
5 /
\ 3
.
l
-
Y
Scanned by CamScanner
95
0
advertisement
Related documents
Download
advertisement
Add this document to collection(s)
You can add this document to your study collection(s)
Sign in Available only to authorized usersAdd this document to saved
You can add this document to your saved list
Sign in Available only to authorized users