Taylor Series - Calculus - Exam, Exams of Calculus

This is the Exam of Calculus which includes Statement, Integral, Function, Graph, Right Hand Sums, Rectangles To Estimate, Definition, Derivative, Method Besides etc. Key important points are: Taylor Series, Centered, Integrated, Trigonometric Substitution, Solid of Revolution Generated, Represents The Volume, Revolving The Curve, Chart, Choices, Problem

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2012/2013

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Name Instructor Section No.
Student Number
Math 113/113H Winter 2006
Departmental Final Exam
Instructions:
The time limit is 3 hours.
Problems 1-6 short-answer questions, each worth 2 points.
Problems 7 through 13 are multiple choice questions, each worth 3 points.
For problems 14 through 24, give the best answer and justify it by giving suitable reasons
and/or by showing relevant work.
Work on scratch paper will not be graded.
Please write neatly.
Notes, books, and calculators are not allowed.
Expressions such as ln(1), e0, sin(π/2), etc. must be simplified for full credit.
For administrative use only:
1–6 /12
M.C. /21
14 /4
15 /4
16 /4
17 /6
18 /4
19 /8
20 /4
21 /8
22 /8
23 /9
24 /8
Total /100
0
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Name Instructor Section No.

Student Number

Math 113/113H – Winter 2006

Departmental Final Exam

Instructions:

  • The time limit is 3 hours.
  • Problems 1-6 short-answer questions, each worth 2 points.
  • Problems 7 through 13 are multiple choice questions, each worth 3 points.
  • For problems 14 through 24, give the best answer and justify it by giving suitable reasons and/or by showing relevant work.
  • Work on scratch paper will not be graded.
  • Please write neatly.
  • Notes, books, and calculators are not allowed.
  • Expressions such as ln(1), e^0 , sin(π/2), etc. must be simplified for full credit.

For administrative use only:

M.C. /

Total /

Short Answer.

ln x dx =

∫ (^) π/ 2 0 sin^ x dx^ =

tan x sec^2 x dx =

  1. The Taylor series for e^2 x, centered at 0, is

x^2 √ x^2 + 4

dx can be integrated using the trigonometric substitution x =

  1. The definite integral

0 2 πx

x^2 + 1 dx represents the volume of the solid of revolution generated

by revolving the curve y = , x ∈ [ , ], about the y-axis.

Multiple Choice. Use the following chart to show your choices for Problems 7–13. Shade in your choice. Only this chart will be graded on these problems.

Problem 7 (a) (b) (c) (d) (e) (f) (g) (h) (i) (j) Problem 8 (a) (b) (c) (d) (e) (f) (g) (h) (i) (j) Problem 9 (a) (b) (c) (d) (e) (f) (g) (h) (i) (j) Problem 10 (a) (b) (c) (d) (e) (f) (g) (h) (i) (j) Problem 11 (a) (b) (c) (d) (e) (f) (g) (h) (i) (j) Problem 12 (a) (b) (c) (d) (e) (f) (g) (h) (i) (j) Problem 13 (a) (b) (c) (d) (e) (f) (g) (h) (i) (j)

1

xp^ dx

(a) converges if 0 < p < 1 (b) converges if p = 1 (c) converges if p > 1

(d) diverges if p > 1 (e) diverges if p > 0 (f) diverges if p 6 = 1

(g) none of these

  1. By using two non-zero terms of the Taylor series, the integral

0 sin(x

(^2) ) dx is approximately

(to two digit accuracy)

(a) .96 (b) .43 (c) .31 (d) .29 (e) .12 (f).

ex^ cos x dx =

(a) ex^ sin x + C (b) ex^ cos x − ex^ sin x + C (c) ex^ sin x − ex^ sin 2x + C

(d) 12 ex^ sin x + 12 ex^ cos x + C (e) 2ex^ sin x − 2 ex^ cos x + C (f) none of the above

Answers to Problems 12 and 13 must be shaded in the chart on Page 1 to be counted.

Essay Problems Work Problems 14–24 as you would homework problems, showing your steps and justifying them.

  1. Find a formula for

1 − a^2 x^2 dx (a > 0)

  1. Find the length of the curve y = ln(sin x), x ∈ [ 16 π, 14 π].
  1. Evaluate

∫ (^) π/ 2

0

sin^3 x cos^2 x dx.

  1. A swimming pool has a circular window of radius 1.2 meters in a side wall. When the water in the pool exactly covers the lower half of the window, what is the force of the water pressure on the window? (Assume that the side wall is vertical; give your answer in terms of the weight-density w of the water.)
  2. Find

x + 1 x^2 − 4

dx.

  1. For each of the following power series, determine what function it converges to, and find the interval of convergence (watch the end-points).

(a)

∑^ ∞

n=

nxn−^1

(b)

∑^ ∞

n=

(−1)n^ x^3 n n!

  1. (a) Give the formal definition of the statement lim n→∞ an = L.

(b) Determine the limit lim n→∞

π n

)n (by any means).

  1. (a) Sketch the graph of r = eθ/^2.

(b) Find the area inside the curve r = eθ/^2 and outside the circle r = 1 for 0 ≤ θ ≤ π.

(c) Find the slope of the polar curve r = eθ/^2 at the point [1, 0].