Question 2 and 4 only please 2. Solvefor r [0, π] with the boundary conditionsand the initial conditionsUtt- c²Uzz = 0Hint:U₂ (0, t) = U₂(T, t) = 0U(x,0) = 0,U₁(x, 0) = cos²x.• cos²x =cos(2x)+1=• Also notice the boundary conditions for this question, compared to the one U(0, t)U(L, t) = 0 in the lecture notes, and the one U₂(0, t) = U(L, t) = 0 from Question 1.3. Find the Fourier series of f(x) = |x| on [-L, L]. Draw a sketch of f(x).4. Find the Fourier series of f(x) = | sin x on the interval [-, π]. Draw a sketch of f(x).

(2)We have given the partial differential equation with boundary and initial conditions.We use the…

Answered: 2. Solve Utt- c²UTT for x = [0, π] with…

2. Solve Utt- c²UTT for x = [0, π] with the boundary conditions and the initial conditions = 0 U₂ (0, t) = U₂(π, t) = 0 U(x,0) = 0, Ut(x,0) = cos²x.

Calculus For The Life Sciences

2nd Edition

ISBN:9780321964038

Author:GREENWELL, Raymond N., RITCHEY, Nathan P., Lial, Margaret L.

Publisher:GREENWELL, Raymond N., RITCHEY, Nathan P., Lial, Margaret L.

Chapter6: Applications Of The Derivative

Section6.CR: Chapter 6 Review

Problem 38CR

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Question

Question 2 and 4 only please

2. Solve
for r [0, π] with the boundary conditions
and the initial conditions
Utt- c²Uzz = 0
Hint:
U₂ (0, t) = U₂(T, t) = 0
U(x,0) = 0,
U₁(x, 0) = cos²x.
• cos²x =
cos(2x)+1
=
• Also notice the boundary conditions for this question, compared to the one U(0, t)
U(L, t) = 0 in the lecture notes, and the one U₂(0, t) = U(L, t) = 0 from Question 1.
3. Find the Fourier series of f(x) = |x| on [-L, L]. Draw a sketch of f(x).
4. Find the Fourier series of f(x) = | sin x on the interval [-, π]. Draw a sketch of f(x).

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