Thursday, 27 April 2017

Math 205 Midterm

Math 205 Midterm
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1. (5 marks): (a)
Approximate the de nite integral A =
3


R


approximating rectangles of equal widths.

Riemann sum

3
using 3

R


(b)Now nd the approximation by a left Riemann sum L3, again using 3 approximating rectangles of equal widths.
(c)Calculate the exact value of A by integrating. Comparing this value with
12 (R+ L3) : Do your results found in (a) and (b) appear reasonably





accurate?













2.
(3 marks): (a) Use Part 1 of the Fundamental Theorem of Calculus to nd F0(x)







3
p




dt.








for F(x) =
cos x
1 + t3











R





10t




3.
(5 marks): Find f(t); given f0(t) =
p3

and f(8) = 20.
t 2

















4.
(10 marks): Calculate the following inde nite integrals


Z

p
x3


Z
3
x+ 4x + 4


(a)


dx
(b)



dx




x+ x


16 x2

5.
(12 marks): Evaluate the following de nite integrals (do not approximate):











e




(a)
Z0
cosx tanx dx

(b)

Z1
xln xdx

6. (5 marks): Find the area of the region enclosed by the curves x = jyj and x = y2.
Bonus. (2 marks): Given that
Z
[f (x) + f00 (x)] sin xdx = 2
0
and f ( ) = 1; nd f (0).



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