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: \({e^{\sin t - 2{t^3}}}(\cos t - 6{t^2})\)
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: \({e^{\sin t - 2{t^3}}}(\cos t - 6{t^2})\)
设\(z = {e^{x - 2y}}\),而\(x = \sin t,\;y = {t^3},\)则\( { { dz} \over {dt}} = \)( ) A: \({e^{\sin t - 2{t^3}}}\) B: \({e^{\sin t - 2{t^3}}}\left( {\cos t - 6{t^2}} \right)\) C: \({e^{\sin t - 2{t^3}}}\ {\sin t } \) D: \({e^{\sin t - 2{t^3}}}\,{t^3}\)
设\(z = {e^{x - 2y}}\),而\(x = \sin t,\;y = {t^3},\)则\( { { dz} \over {dt}} = \)( ) A: \({e^{\sin t - 2{t^3}}}\) B: \({e^{\sin t - 2{t^3}}}\left( {\cos t - 6{t^2}} \right)\) C: \({e^{\sin t - 2{t^3}}}\ {\sin t } \) D: \({e^{\sin t - 2{t^3}}}\,{t^3}\)
已知α1=(1,2,-1)T,α2=(1,-3,2)T,α3=(4,11,-6)T,若Aα1=(0,2)T,Aα2=(5,2)T,Aα3=(-3,7)T,则A=______。
已知α1=(1,2,-1)T,α2=(1,-3,2)T,α3=(4,11,-6)T,若Aα1=(0,2)T,Aα2=(5,2)T,Aα3=(-3,7)T,则A=______。
下面代码的输出结果是( )。 s=[4,3,6,2] t=sorted(s) print(s) print(t) A: [4, 3, 6, 2] [2, 3, 4, 6] B: [2, 3, 4, 6] [2, 3, 4, 6] C: [4, 3, 6, 2] [4, 3, 6, 2] D: [2, 3, 4, 6] [4, 3, 6, 2]
下面代码的输出结果是( )。 s=[4,3,6,2] t=sorted(s) print(s) print(t) A: [4, 3, 6, 2] [2, 3, 4, 6] B: [2, 3, 4, 6] [2, 3, 4, 6] C: [4, 3, 6, 2] [4, 3, 6, 2] D: [2, 3, 4, 6] [4, 3, 6, 2]
设向量a1=(1 1 2)T,a2=(2 t 4)T,a3=(t 3 6)T,a4=(0 2 2t)T。若向量组{a1,a2,a3,a4}的秩是3,矩阵A=(a1 a2 a3)的秩是2,则参数t=()。 A: 2 B: 3 C: 4 D: 6
设向量a1=(1 1 2)T,a2=(2 t 4)T,a3=(t 3 6)T,a4=(0 2 2t)T。若向量组{a1,a2,a3,a4}的秩是3,矩阵A=(a1 a2 a3)的秩是2,则参数t=()。 A: 2 B: 3 C: 4 D: 6
设向量组Αα1=(1,2,1,3)T,α2=(4,-1,-5,-6)T,2)T向量组B:β1=(-1,3,4,7)T,β2=(2,-1,-3,-4)T,试证明;
设向量组Αα1=(1,2,1,3)T,α2=(4,-1,-5,-6)T,2)T向量组B:β1=(-1,3,4,7)T,β2=(2,-1,-3,-4)T,试证明;
(2,-1,7),(1,4,11)与(3,-6,t)线性相关,则t=
(2,-1,7),(1,4,11)与(3,-6,t)线性相关,则t=
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)
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)
下面代码的输出结果是( )。 t=[1,2,3] s=tuple(t) print(t,s) A: [1, 2, 3] [1, 2, 3] B: (1, 2, 3) (1, 2, 4) C: [1, 2, 3] (1, 2, 3) D: (1, 2, 6)[1, 2, 3]
下面代码的输出结果是( )。 t=[1,2,3] s=tuple(t) print(t,s) A: [1, 2, 3] [1, 2, 3] B: (1, 2, 3) (1, 2, 4) C: [1, 2, 3] (1, 2, 3) D: (1, 2, 6)[1, 2, 3]
Fill in the blankFor the expressionf(t)=tε(t)+2ε(t−2)−tε(t−2),f(3)=______ .
Fill in the blankFor the expressionf(t)=tε(t)+2ε(t−2)−tε(t−2),f(3)=______ .