IDZ 12.3 - Option 6. Decisions Ryabushko AP
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1. Arrange the Fourier series of periodic (with period ω = 2π) function f (x) defined on the interval [-π; π]
2. Arrange in a Fourier series of f (x), defined in the interval (0; π) continue (where it is defined) its even and odd way. Build charts for each continuing.
2.6. f (x) = (x - 1) 2
3. Arrange in a Fourier series in the specified interval periodic function f (x) with period w = 2l
3.6. f (x) = x, 1 <x <3, l = 1
4. Arrange the Fourier function defined graphically.
5. Using the expansion of the function f (x) in a Fourier series
2. Arrange in a Fourier series of f (x), defined in the interval (0; π) continue (where it is defined) its even and odd way. Build charts for each continuing.
2.6. f (x) = (x - 1) 2
3. Arrange in a Fourier series in the specified interval periodic function f (x) with period w = 2l
3.6. f (x) = x, 1 <x <3, l = 1
4. Arrange the Fourier function defined graphically.
5. Using the expansion of the function f (x) in a Fourier series
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05.11.2015 13:11:33
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