设f1(t)=2[u(t一7)一u(t一1)]，f2(t)=0．5[u(t一5)一u(t一2)]。用图解法求s(t)=f1(t)*f2(t)。

Fill in the blankFor the expressionf(t)=tε(t)+2ε(t−2)−tε(t−2),f(3)=______ .

若F(ω)=[f(t)]，利用Fourier变换的性质求下列函数g(t)的Fourier变换．(1)g(t)=tf(2t)；(2)g(t)=(t一2)f(t)；(3)g(t)=(t一2)f(一2t)；(4)g(t)=t3f(2t)；(5)g(t)=tf’(t)；(6)g(t)=f(1一t)；(7)g(t)=(1一t)f(1一t)；(8)g(t)=f(2t一5)．

已知向量组\(\alpha_{1}=(1,1,2)^T,\alpha_{2}=(3,t,1)^T,\alpha_{3}=(0,2,-t)^T,\)线性相关\(，\)则\(t\)=\(（ \quad ）\)。 A: 、\(t=5\)或\(t=-2\) B: 、\(t=5\)或\(t=2\) C: 、\(t=-5\)或\(t=2\) D: 、\(t=1\)或\(t=-2\)

设\(z = {e^{x - 2y}}\)，而\(x = \sin t\)，\(y = {t^3}\)，则全导数\( { { dz} \over {dt}} = \) A: \({e^{\sin t - {t^3}}}(\cos t - 6{t^2})\) B: \({e^{\sin t - 2{t^3}}}(\sin t - 6{t^2})\) C: \({e^{\cos t - 2{t^3}}}(\cos t - 6{t^2})\) D: \({e^{\sin t - 2{t^3}}}(\cos t - 6{t^2})\)

求微分方程[img=269x55]17da6536a9fba07.png[/img]的通解； （ ） A: (C15*sin(2*t))/exp(3*t) + (C16*sin(2*t))/exp(3*t) B: (C15*cos(2*t))/exp(3*t) - (C16*sin(2*t))/exp(3*t) C: (C15*cos(2*t))/exp(3*t) + (C16*cos(2*t))/exp(3*t) D: (C15*cos(2*t))/exp(3*t) + (C16*sin(2*t))/exp(3*t)

一阶常微分方程[img=152x26]1802e4d6075ee4f.png[/img]的通解为 A: sin(2*t)/5-cos(2*t)/10+C*exp(-4*t) B: sin(2*t)/7+cos(2*t)/5-C*exp(-3*t) C: sin(2*t)/7-C*cos(2*t)/10+C*exp(-2*t) D: sin(2*t)/7-cos(2*t)/7+C*exp(-5*t)

void main(){char s[20]; char *t; t= t + 7 ;}

【多选题】若f 1 (t) = ɛ (-t) , f 2 (t) = e t ,则f 1 (t)* f 2 (t) = A. f 1 ꞌ (t)* f 2 (–1) (t) B. f 1 (–1) (t)* f 2 ꞌ (t) C. f 1 (t-3)* f 2 (t+3) D. f 1 (–3) (t)* f 2 ꞌꞌꞌ (t)

肚脐平面相当于（） A: T₁₀ B: T₄ C: T₁₂ D: C₇～T₅ E: T_2～6