2. In this exercise we show how the symmetries of a function imply certain properties of its Fourier coefficients. Let ƒ be a 27-periodic Riemann integrable function defined on R. Show that the Fourier series of the function f can be written as f(e) ~ ƒ(0) + Elf(n) + ƒ(-n)] cos nº + i[f(n) – ƒ(-n)] sin nô. n21 Prove that if f is even, then ƒ(n) = ƒ(-n), and we get a cosine series. Prove that if f is odd, then ƒ(n) = -f(-n), and we get a sine series.

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2. In this exercise we show how the symmetries of a function imply certain properties of its Fourier coefficients. Let f be a 27-periodic Riemann integrable function defined on R. Show that the Fourier series of the function f can be written as f(0) ~ ƒ(0) + EL(n) + ƒ(-n)] cos no + i[f(n) – ƒ(-n)] sin nô. n21 Prove that if f is even, then f(n) = f(-n), and we get a cosine series. Prove that if f is odd, then f(n) = -f(-n), and we get a sine series. Suppose that f(0 + m) = f(0) for all 0 € R. Show that f(n) = 0 for all odd n. Show that f is real-valued if and only if ƒ(n) = ƒ(-n) for all n.