1 2-1 画出下列各时间函数的波形图,注意它们的区别 1)x 1(t) = sin t·u(t) 2)x 2(t) = sin[ ( t – t0 ) ]·u(t) 3)x 3(t) = sin t·u ( t – t0 ) 0 1 t0 t x 2(t) -1 1 -1 π 2π 3π t x 1(t) 0 4π 0 1 t0 t x 3(t) 2 4)x 2(t) = sin[ ( t – t0 ) ]·u ( t – t0 ) 2-2 已知波形图如图 2-76 所示,试画出经下列各种运算后的波形图 (1)x ( t-2 ) (2)x ( t+2 ) 0 1 t0 t x 4(t) -1 0 1 t x (t) -1 1 2 3 图 2-76 0 1 t x ( t-2 ) -1 1 2 3 4 -3 1 t x ( t+2 ) -4 -2 -1 0 1 3 (3)x (2t) (4)x ( t/2 ) (5)x (-t) (6)x (-t-2) 0 1 t x (2t) -1 1 2 3 0 1 t x ( t/2 ) -1 1 2 3 4 -2 -3 1 t x (-t) 2 -2 -1 0 1 -5 1 t 0 -4 -3 -2 -1 1 x (-t-2) 4 (7)x ( -t/2-2 ) (8)dx /dt 2-3 应用脉冲函数的抽样特性,求下列表达式的函数值 (1))(0ttxδ (t) dt = x (-t0) (2) )(0ttxδ (t) dt = x (t0) (3))(0tt u (t - 20t ) dt = u ( 20t ) (4) )(0tt u (t – 2t0) dt = u (-t0) (5) te tδ (t+2) dt = e2-2 (6)ttsin δ (t- 6 ) dt = 6 + 21 -5 1 t 0 -4 -3 -2 -1 1 x ( -t/2-2 ) -7 -6 -8 0 1 t dx /dt -1 1 2 3 -2 -δ (t-2) 5 (7) dttttetj0 = dttetj –dtttetj)(0 = 1-0tje = 1 – cosΩ t0 + jsinΩ t0 2-4 求下列各函数 x 1(t)与 x 2(t) 之卷积,x 1(t)* x 2(t) (1) x1(t) = u(t), x2(t) = e-at · u(t) ( a>0 ) x1(t)* x2(t) =dtueua)()( = ta de0 = )1(1atea (2) x1(t) =δ (t+1) -δ (t-1) , x2(t) = cos(Ω t + 4) · u(t) x1(t)* x2(t) =dttut)]1()1([)]()4[cos( = cos[Ω (t+1)+ 4]u(t+1) – cos[Ω (t-1)+ 4]u(t-1) (3) x1(t) = u(t) – u(t-1) , x2(t) = u(t) –...
