9.3 Application Fourier Series of Piecewise Smooth Functions (p608)
To define piecewise functions you can use either piecewise (do ?piecewise for the syntax) or use the book's suggestion, which is to define a function "unit" that is one on the interval (a,b) and zero otherwise:
unit := (t,a,b) -> Heaviside(t-a) - Heaviside(t-b);
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plot(unit(t,0.5,1.5),t=-2..2);
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
Here is the function in Figure 9.3.8. This function is even, thus to find its Fourier coefficients we only need to define it on [0,Pi]:
f := t -> (Pi/3)*unit(t, 0, Pi/6) + (Pi/2 - t)*unit(t, Pi/6, 5*Pi/6) + (-Pi/3)*unit(t, 5*Pi/6, Pi);
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To double check that we have the correct expression we can plot the function
plot(f(t),t=0..Pi);
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Since the function is EVEN b_n = 0 for n>=1, thus we only compute the a_n:
a := n -> (2/Pi) * int(f(t)*cos(n*t),t=0..Pi);
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The "assuming integer" at the end of the expression tells Maple that n is an integer for addition simplifications, however an expression does not come to mind!
a(n) assuming integer;
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So we simply compute the Fourier sum, with say 25 terms
fouriersum := a(0)/2 + sum(a(n)*cos(n*t),n=1..25);
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And we check that the Fourier sum is consistent with the function we asked.
plot(fouriersum, t= -2*Pi..3*Pi);
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
In the same way it is possible to compute the coefficients b(n) for odd functions or more generally the a(n) and b(n) for general (not odd neither even) functions.