The Fourier integrals of two continuous functions f(x) and g(z) defined on R are given by 8, f(z) = cos(wz) + sin(wr) dw w3 COS 0. and g(=) = / g(x) = 0, 1. s cos(w"z) + cos(wr)+ w17 sin(w"z) du. %3D w33 Then 1. f(x) = 16 - g(x) 2. f(x) = 17 g(x) 3. f(x) = 32 g(x) 4. g(x) = 256 - f(x) %3D 5. f(x) = 33 · g(r) g(x) 6. f(x) = 17 %3D33

Transcribed Image Text:

The Fourier integrals of two continuous functions f(I) and g(z) defined on R are given by 00 f(=) = cos(wr) + sin(wr)| dw w3 and g(=) = cos(w2) + cos(wz) + w17 dw. w33 Then 1. f(r) = 16 - g(x) 2. f(x) = 17 g(x) 3. f(x) = 32 g(æ) 4. g(x) = 256 f(x) 5. f(x) = 33 · g(x) %3D %3D %3D g(x) 6. f(2) = 17 %3D Select one: 01