Math 241 Makeup Exam Fall 2007: Solutions and Questions, Exams of Mathematics

The instructions and questions for a makeup exam in math 241 (calculus iii) that was held in fall 2007. The exam covers topics such as taylor series, laurent series, harmonic conjugates, integration, and fourier series. Students are required to provide work for each problem and are not allowed to use calculators or books, but they can bring an 8.5 x 11 inch sheet of notes. The exam lasts for 2 hours.

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2012/2013

Uploaded on 02/12/2013

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Name ________________________
Math 241 Makeup Exam
Fall 2007
Write your name in the space provided. Be prepared to show your Penn ID if asked.
Indicate which professor’s class you are enrolled in.
You will have 2 hours to complete the exam.
No calculators or books are permitted, however you may use an 8 ½ in.
11 in. sheet of notes.
Mark your answer on this sheet and on the problem itself. Do not detach this sheet.
Although this is a multiple choice exam, you must provide work to support your answer.
Use the space provided beneath each problem to show your work.
A correct answer with no work will be graded as an incorrect answer.
Each problem is equally weighted with no partial credit given for skipped or incorrect solutions.
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Download Math 241 Makeup Exam Fall 2007: Solutions and Questions and more Exams Mathematics in PDF only on Docsity!

Name ________________________

Math 241 Makeup Exam

Fall 2007

Write your name in the space provided. Be prepared to show your Penn ID if asked.

Indicate which professor’s class you are enrolled in.

You will have 2 hours to complete the exam.

No calculators or books are permitted, however you may use an 8 ½ in. „„„„ 11 in. sheet of notes.

Mark your answer on this sheet and on the problem itself. Do not detach this sheet.

Although this is a multiple choice exam, you must provide work to support your answer.

Use the space provided beneath each problem to show your work.

A correct answer with no work will be graded as an incorrect answer.

Each problem is equally weighted with no partial credit given for skipped or incorrect solutions.

  1. Find the radius of convergence for the Taylor series of (^ )^8

f z

z

about the point z = 2 2 + 2 2 i.

(A) 1 (C) 2 (E) 3 (G) 4

(B)
(D)
(F)
(H) ∞

3. Find the constant k such that the function ( )

2 3 v x y , = 3 x y + ky − x+ 1 is a harmonic

conjugate of the function ( )

3 2 u x y , = x − 3 xy +y.

(A) − 3 (C) − 1 (E) 1 (G) 3

(B) − 2 (D) 0 (F) 2 (H) 4

  1. Evaluate

2

0

i iz e dz ∫ (^).

(A) (^) ( )

2 i 1 e

− − (C)

2 1 ie

− − (E)

2 i e

− − (G)

2 1 e

− −

(B) (^) ( )

2 i 1 e

  • (D)

2 1 ie

  • (F)

2 i e

  • (H)

2 1 e

  1. Evaluate

2

2 cos

0

d

π

θ

∫ − θ .

(A) π (C)

(E)

π (G) 4

(B)

π (D) 2

(F)
(H)
  1. Evaluate

2

dx

x x

(A)− π (C) 24

− (E)
(G)
(B)
− (D) 0 (F)

(H) π

  1. Consider the Sturm-Liouville problem defined on 0 2

x

(^0) ( 0 ) 0, 0

y y y y

π λ

Find all eigenvalues λn , n= 0,1, 2,….

(A)

2

λ n = n (C)

n

n

λ = (E)

n

n π

= (G)

2 2 1

2

n

n π

(B)

2

n

n

λ = (D)

n

n π

= (F) ( )

2

λn = 2 n− 1 (H)

2 2 1

4

n

n π

10. The solution u x t( , )defined for 0 ≤ x ≤ 2, t≥ 0 to the wave equation

utt = uxx with boundary conditions u x ( 0, t ) = ux ( 2, t)=0 is

( ) ( 2 ) ( 2 ) ( 2 ) 0

, cos sin cos

n n n n n n

u x t A t B t x

π π π

=

=  +  ∑ (^)  .

Find

u

with initial conditions u x( , 0 (^) ) = 3cos (^) ( πx (^) ) and ut (^) ( x, 0 (^) ) =2 cos 3( π x).

(A)
(C)
(E)
(G)
(B)
(D)
(F)
(H) 2
  1. Consider a circular plate of radius 1 whose circular edge is maintained at the temperature

u ( 1, θ )= θ. The steady-state temperature ( ) 0 ( ) ( )

1

, cos sin

n n n n

u r θ A r A nθ B nθ

=

= + (^) ∑  + 

satisfies (^) rr 1 r r^12 0. r

u + u + u θθ= Find the coefficient of the sin 3( θ )term.

(A) 0 (C)

(E)
(G)
(B)
(D)
(F)
(H)