Figure 1 shows a periodic function, f(x), with period of 2n. f(x) mim –π 0 π ao = 2A T (a) State if the function f(x) has odd or even symmetry. (b) Show that the Fourier coefficients of f(x) are given by: N a₁ = Figure 1 f(x) = X 2A 1+(-1)" 1-n² T T f(x)=< 2A 44(1 A is a constant. Hint: You will find the result in question 1 (b) useful to find an. Also, remember that a ƒ ƒodd (X)dx=0, ƒ ƒven(x)dx = 2] ƒeven (x)dx -a -a 0 b₁ = 0 (c) By evaluating the first six Fourier coefficients show that the Fourier series of f(x) is given by: Asin x if 0≤x≤n -Asinx if -≤x≤0 1 1 44 ( cos(2x) + = cos(4x) + = cos( TU 3 15 35 -cos(6x)+...

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Figure 1 shows a periodic function, f(x), with period of 2π. f(x) wimm -π O π ao = (a) State if the function f(x) has odd or even symmetry. 2 A (b) Show that the Fourier coefficients of f(x) are given by: TC Figure 1 a₁ = 2A 1+(-1)" 1-n² T f(x)= Asinx if 0≤x<a - Asinx if -≤x≤0 f(x)= A is a constant. b₁ = 0 Hint: You will find the result in question 1(b) useful to find an. Also, remember that ƒ ƒodt (x) dx = 0, ƒ ƒeven (x) dx = 2 feven (x)dx -a -a 0 - 24_44 ( cos(2x) + = cos(4x) + 2A TU TU 15 (c) By evaluating the first six Fourier coefficients show that the Fourier series of f(x) is given by: 1 +cos 35 -cos(6x)+...