Math1210 Midterm 3 Extra Review Key
1. Evaluate
(a)
∫ ( 2x 4 ( x 5−1)−2/3) dx = 65 ( x 5−1)1/3+C
(b)
∫ 3 √5 t− t42 +2t 3−sin t +10
(c)
(d)
(
(2x +3)2
) dt = 52 t
6/5
4 1
+ + t 4 +cos t +10t+C
t 2
∫ √ x dx = 85 x 5 /2+8 x 3/ 2+18 √ x+C
3
∫ ( 4 x 5−cos x+√ x 2) dx = 23 x 6−sin x+ 35 x 5/3+C
4x
dx=4 √ x 2 −3+C
2
√ x −3
1
3
4
4
3/2
(f) ∫ ( 2 x √ 2x +3) dx = (2x +3) +C
6
(e)
∫
2. Solve the following differential equation.
3
dy
=
dx
Answer:
4x 
1
2
x
such that
y=−1 when
x=1
4
3y
5
5
y= 5 x 4 − −1
3
3x
√
f  x=
3. For the function
3x−2
on the closed interval [1, 4], decide whether or not the Mean Value
x−5
Theorem for Derivatives applies. If it does, find all possible values of c. If not, then state the reason.
Answer: Yes MVT applies because the function is continuous and differentiable on [1, 4].
c=3
x 4−53=0 using Newton's Method, accurate to four decimal places.
x 4n −53 4 x 4n −x 4n+53 3x 4n +53
Use x n+1 =x n −
=
=
. If you start with x 1=2.5 (why? Because I
4x 3n
4x 3n
4x 3n
4
4
know that 2 =16 and 3 =81 and 53 is somewhere between 16 and 81), then you'll get these values
4. Solve
out: 2.5, 2.723, 2.698505497, 2.69816794, and 2.698167876. So the answer is approximately 2.6982 to
four decimal places.
2
5. For f  x=3x 4x−1 on [0, 2], decide whether or not the Mean Value Theorem (for Derivatives)
applies. If it does, find all possible values of c. If not, then state the reason.
Answer: Yes MVT applies because the function is continuous and differentiable everywhere.
c=1
6. Solve this equation using (A) the Bisection Method and (B) Newton's Method to three decimal places.
f  x=2x 3−4x1=0 On [0, 1]
Answer: should get (A) the midpoint of the interval from 0.2578125 to 0.26171875 which would be
0.259765625 which is about 0.2598 and (B) 0.2586
dy x3x2
7. Solve this differential equation.
=
dx
y2
3 3 2
x +3 x 3 +8
Answer: y=
2
10
and
x =0
y=2 when
√
∑ [(i−2)( 2i+5)]=725
8. Evaluate
i=1
9. Evaluate the definite integral using the definition (the tedious way).
2
∫ (5x−1) dx
n
∑
i=1
n
a
i=1
∫ f  x  dx=lim
∑ f  xi   x
n ∞
. (Note: Here is the definition.
−1
3
3i
Answer: Δ x =
, x i =−1+
,
n
n
b
n
f ( x i ) Δ x =∑
i=1
(
−18 45i
+ 2
n
n
)
)
2
,
∫ (5x−1) dx=4.5
−1
10
10. Evaluate
∑ [(3i−4)(i+5)]=1640
i=1
3
11. Evaluate the definite integral using the definition (the tedious way).
Answer:
Δ x=
3
3i
, xi=
,
n
n
n
∑
i=1
n
f ( x i ) Δ x =∑
i=1
(
108i 2 3
−
n
n3
)
∫ ( 4x 2−1) dx
.
0
3
,
∫ ( 4x 2−1) dx=33
0