The Fourier series Sx of fx x on 1 1 with fx 2 fX converg
     ___The Fourier series, S(x), of f(x) = x on [-1, 1] with f(x + 2) = f(X), converges  To f(x) for all x on (-infinity, infinity).  To 0 for all x on [-1, 1].  To f(x) for all x on (-1, 1) and to 0 for x = plusminus 1.  To |x| for all x on (-1, 1) and to 0 for x = plusminus 1.![___The Fourier series, S(x), of f(x) = x on [-1, 1] with f(x + 2) = f(X), converges To f(x) for all x on (-infinity, infinity). To 0 for all x on [-1, 1]. To f  ___The Fourier series, S(x), of f(x) = x on [-1, 1] with f(x + 2) = f(X), converges To f(x) for all x on (-infinity, infinity). To 0 for all x on [-1, 1]. To f](/WebImages/7/the-fourier-series-sx-of-fx-x-on-1-1-with-fx-2-fx-converg-991609-1761509966-0.webp) 
  
  Solution
B is the right answer i.e., convergers to 0 on [-1,1]
![___The Fourier series, S(x), of f(x) = x on [-1, 1] with f(x + 2) = f(X), converges To f(x) for all x on (-infinity, infinity). To 0 for all x on [-1, 1]. To f  ___The Fourier series, S(x), of f(x) = x on [-1, 1] with f(x + 2) = f(X), converges To f(x) for all x on (-infinity, infinity). To 0 for all x on [-1, 1]. To f](/WebImages/7/the-fourier-series-sx-of-fx-x-on-1-1-with-fx-2-fx-converg-991609-1761509966-0.webp)
