KOC University, Math 106 Calculus Midterm II - Solutions, Exams of Calculus

The solutions to the math 106 calculus midterm ii exam held at koc university on april 9, 2007. Problems on finding derivatives, limits, slopes of tangent lines, sketching graphs, and evaluating integrals.

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2012/2013

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KOCยธ UNIVERSITY
MATH 106 - CALCULUS
Midterm II April 9, 2007
Duration of Exam: 75 minutes
INSTRUCTIONS: Calculators may not be used on the test. No books, no notes, and
no talking allowed. You must always explain your answers and show your work to
receive full credit. Use the back of these pages if necessary. Print and sign your name,
and indicate your section below.
Surname, Name: โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”
Signature: โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”
Section (Check One):
Section 1 - 11:30 โ€”โ€“
Section 2 - 14:30 โ€”โ€“
PROBLEM POINTS SCORE
1 27
2 30
3 22
4 26
TOTAL 105
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KOCยธ UNIVERSITY

MATH 106 - CALCULUS

Midterm II April 9, 2007

Duration of Exam: 75 minutes

INSTRUCTIONS: Calculators may not be used on the test. No books, no notes, and no talking allowed. You must always explain your answers and show your work to receive full credit. Use the back of these pages if necessary. Print and sign your name, and indicate your section below.

Surname, Name: โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”

Signature: โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”โ€”

Section (Check One):

Section 1 - 11:30 โ€”โ€“ Section 2 - 14:30 โ€”โ€“

PROBLEM POINTS SCORE

TOTAL 105

  1. (a) (10 points) Find

dy dx

, where x^2 y^2 โˆ’ 2 x = 4 โˆ’ 4 y.

(b) (7 points) Evaluate the limit lim xโ†’ 0

tan x โˆ’ x x^2

(c) (10 points) Find the slope of the tangent line to the curve F (x) at x = 1, where

F (x) =

โˆซ (^) x 2

1

t^2 + 1 dt.

  1. (a) (12 points) Find the point on the parabola y = 9 โˆ’ x^2 closest to the point (3, 9).

(b) (10 points) Show that if f โ€ฒโ€ฒ^ < 0 throughout an interval [a, b], then f โ€ฒ^ has at most one

zero in [a, b].

  1. (a) (10 points) Let f (x) = x^3. Find

0

f (x)dx using upper Riemann sums with subin-

tervals of equal length.

Hint :

โˆ‘^ n

k=

k^3 =

n(n + 1) 2

(b) (6 points) Evaluate the indefinite integral

(3 sin x + 4)^5 cos x dx.

(c) (10 points) Find the area of the region bounded by the graphs y = x^2 , y = 2 โˆ’ x, and

y = 0.