The Fourier series of a periodic function xT(t) with a period T is given by\(\mathop \sum \nolimits_{k = - \infty }^\infty {X_s}\left( k \right){e^{jk{\omega _0}t}}\), where ω0 = 2πT and the Fourier coefficient Xs(k) is defined as,\({X_s}\left( k \right) = \frac{1}{T}\smallint {x_T}\left( t \right){e^{ - jk{\omega _0}t}}dt\)If xT(t) is real and odd, the Fourier coefficients Xs(k) are

The Fourier series of a periodic function xT(t) with a period T is giv

1.	The Fourier series of a periodic function xT(t) with a period T is given by\(\mathop \sum \nolimits_{k = - \infty }^\infty {X_s}\left( k \right){e^{jk{\omega _0}t}}\), where ω0 = 2πT and the Fourier coefficient Xs(k) is defined as,\({X_s}\left( k \right) = \frac{1}{T}\smallint {x_T}\left( t \right){e^{ - jk{\omega _0}t}}dt\)If xT(t) is real and odd, the Fourier coefficients Xs(k) are
A.	Real and odd
B.	Complex
C.	Real
D.	Imaginary
Answer» E.