Example: Find the Fourier series f∫(t) 10 10 f()=at(0<at<2) 2兀 10 2 4丌 5 22 2兀 2丌10 110at n Dat cos natd(at= sin not+-cos not 0 丌02丌 丌2丌n 0 2丌10 110 G at sin natd(at) cos not+-sinnot 丌02兀 x2兀 n 0 10 10 2丌cos2+0 2n兀 2 n兀 oo 10 10 10 10 sinnot ∴∫(D)=5-- sinat-sin2a sInsa 5 2兀 3兀 ∑ n=1Example: Find the Fourier series (0 2 ) 2 10 ( )     f t = t  t  5 2 10 2 0 = = a ) cos ( ) 2 10 ( 1 2 0 a t n t d t n        = ) sin ( ) 2 10 ( 1 2 0 b t n td t n        =      n n 10 2 cos2 0 2 10 2 = − + = − f t t t t       sin3 3 10 sin2 2 10 sin 10  ( ) = 5 − − − t 2 4 f (t) 100 cos 0 1 sin 2 1 10 2 0 2  =      = +       n t n n t n t       2 0 2 sin 1 cos 2 1 10       = − + n t n n t n t   = = − 1 10 sin 5 n n nt 