a . Show that the function f ( x ) = x 2 has the Fourier series, on − π < x < π , f ( x ) ∼ π 2 3 + 4 ∑ n = 1 ∞ ( − 1 ) n n 2 cos n x . b . Use the result of part (a) and Theorem 2 to show that ∑ n = 1 ∞ ( − 1 ) n + 1 n 2 = π 2 12 . c . Use the result of part (a) and Theorem 2 to show that ∑ n = 1 ∞ 1 n 2 = π 2 6 .
a . Show that the function f ( x ) = x 2 has the Fourier series, on − π < x < π , f ( x ) ∼ π 2 3 + 4 ∑ n = 1 ∞ ( − 1 ) n n 2 cos n x . b . Use the result of part (a) and Theorem 2 to show that ∑ n = 1 ∞ ( − 1 ) n + 1 n 2 = π 2 12 . c . Use the result of part (a) and Theorem 2 to show that ∑ n = 1 ∞ 1 n 2 = π 2 6 .
Solution Summary: The author explains the Fourier series formula: f(x)=a_02+displaystyle
Show that the Laplace equation in Cartesian coordinates:
J²u
J²u
+
= 0
მx2 Jy2
can be reduced to the following form in cylindrical polar coordinates:
湯(
ди
1 8²u
+
Or 7,2 მ)2
= 0.
Draw the following graph on the interval
πT
5π
< x <
x≤
2
2
y = 2 cos(3(x-77)) +3
6+
5
4-
3
2
1
/2 -π/3 -π/6
Clear All Draw:
/6 π/3 π/2 2/3 5/6 x 7/6 4/3 3/2 5/311/6 2 13/67/3 5
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Determine the moment about the origin O of the force F4i-3j+5k that acts at a Point A. Assume that the position vector of A is (a) r =2i+3j-4k, (b) r=-8i+6j-10k, (c) r=8i-6j+5k
Chapter 10 Solutions
Fundamentals of Differential Equations and Boundary Value Problems
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