Mon 11/25
Boot-Up
11.25.13 / 6 min.
1) Are the s shown ?
 Yes  No
2) Theorem used: ______
3) Show proof.
BD = AC
SAS
6-2b
B  C
ABD

BCA
BC = BC
1st Time
2nd Time
85
78
72
Chapter 8 Quiz
90
Chapter 6 Test
86
Chapter 5 Test
86
Chapter 4 Test
91
Chapter 4 Quiz
74
Term 1 Test
82
Ch 3 Test
90
Ch 3 Section 1 Quiz
80
Ch 2 Test
70
Ch 2 Sec 1 Quiz Angles
81
Ch 1 Test Symmetry, Transformations, P&P
Lines, P&A Zoom, Angles
60
Ch 1 Quiz Algebra Review & 1.1.3
Perimeter/Area
80
YTD Average
Block 1 Test Performance: Class Averages / Term 1
100
80
65
50
40
30
20
10
0
Chapter 8 11/20 Quiz Performance: Block 1 (Without Bonus)
48%
12
11
10
8
22%
5
4
0
50%
40%
6
2
60%
30%
13%
13%
3
4%
20%
3
10%
1
A
0%
B
C
Series1
D
Series2
F
Chapter 8 11/20 Quiz Performance: Block 1 (With Bonus)
7
30%
26%
6
22%
22%
5
5
6
25%
5
4
17%
4
13%
20%
15%
3
3
2
10%
5%
1
0
0%
A
B
C
Series1
D
Series2
F
75
79
1st Time
2nd Time
84
50
40
30
20
10
0
78
Chapter 8 Quiz
79
Chapter 6 Test
89
Chapter 5 Test
Chapter 4 Test
89
Chapter 4 Quiz
72
Term 1 Test
82
Ch 3 Test
80
Ch 3 Section 1 Quiz
70
Ch 2 Test
78
Ch 2 Sec 1 Quiz Angles
79
Ch 1 Test Symmetry, Transformations, P&P
Lines, P&A Zoom, Angles
60
Ch 1 Quiz Algebra Review & 1.1.3
Perimeter/Area
70
YTD Average
Block 2 Test Performance: Class Averages / Term 1
100
90
73
Chapter 8 11/20 Quiz Performance: Block 2 (Without Bonus)
8
30%
27%
7
6
23%
19%
5
4
5
15%
6
20%
15%
15%
4
4
3
7
25%
10%
2
5%
1
0
0%
A
B
C
Series1
D
Series2
F
Chapter 8 11/20 Quiz Performance: Block 2 (With Bonus)
12
45%
38%
40%
10
8
35%
10
27%
30%
25%
6
7
12%
8%
4
3
2
15%
4
20%
15%
10%
2
5%
0
0%
A
B
C
Series1
D
Series2
F
There are 2 things you have to do to prove
congruence. They are:
1) Prove Similarity. (That they’re the Same Shape.)
2) Prove Side Lengths have a common ratio of 1.
(That they’re the Same Size.)
If you prove similarity by virtue of
 congruence, how many sides
do you have to prove are
congruent to prove s are ?
6-2a
1) SAS
(Side-Angle-Side)
6-12
If 2 sides & the included
 of one  are  to the
corresponding parts of
another , the s are .
2) SSS
(Side-Side-Side)
If 3 sides of 1  are 
to 3 sides of another ,
the s are .
3) ASA
(Angle-Side-Angle)
If 2 s and the included
side of 1  are  to the
corresponding parts of
another , the s are .
4) AAS
(Angle-Angle-Side)
AAS
If 2 s and the nonincluded side of one 
are  to the
corresponding parts of
another , the s are .
5) HL
(Right s Only)
If the hypotenuse & leg
of one right  are  to
the corresponding
parts of another right
, the right s are .
Why not AA for Congruence?
Are these s also ?
Explain how you know.
6-1
BDC

 BDA
DBA

 DBC
Are these s also ?
Explain how you know.
BD = BD =
6-2a
BD = 1
1
BD
ABD

CBD
AA
4-68
A  B
AB = AB
ABD

BCA
6-2d
C  D
ABD

BAC
AA
D  B
6-32a
AAS
DCA

BAC
 ABC

 CDA
AC = AC
6-2c
Wanna hint?
Read p.506!
8-49a
This’s tougher than
battling Doc Ock!
Better re-Read p.506!
8-49b
8-51
Wouldn’t it be
great if we
could conjure
up a shortcut
for this?!
8-113
8-114
8-112
8-115
Tue 11/26
Boot-Up
11.26.13 / 6 min.
What is the area of
this shape? ______
Test Rules:
1) No noise / talking / disruptions.
2) Eyes on your own papers.
3) When finished, put pencil down, open textbook, &
solve the following problems on pages 517 -- 519:
8-116,
8-119,
8-121,
8-124