To what values does the Fourier sine series converge at z = =0, x= π/2, x = π, x = 3π/2, and z = 2π?

#4 Just part F

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[4] Let f(x) = { ₁ of f. (b) (c) (d) Sketch the odd periodic extension of f. 1 (e) Find the Fourier sine series of f. (f) To what values does the Fourier sine series converge at x = 0, x = π/2, x = π, x = 3π/2, and x = 2π? (g) Denote by fep(x) the even periodic extension of f(x). When we use periodic functions of the form T(x) = A + A₁ cos x + B₁ sin x + A₂ cos (2x) + B₂ sin(2x) to approximate fep(r), the error in mean is defined by fep(x) - T(x)|²dx. -ग Determine the values of coefficients A0, A1, B₁, A2, B2 that minimize the error in mean. 0 < x < π/2 π/2 < x < T.