• 2022-06-08 问题

    设方程\(z^2+y^2+z^2 = 4z\)确定函数\(z=z(x,y)\),则\( { { {\partial ^2}z} \over {\partial {x^2}}} =\) A: \( { { { { (2 - z)}^2} + {x^2}} \over { { {(2+ z)}^3}}}\) B: \( { { { { (2 - z)}^2} + {x^2}} \over { { {(2 - z)}^3}}}\) C: \( { { { { (2 - z)}^2} -{x^2}} \over { { {(2 - z)}^3}}}\) D: \( { { { { (2 + z)}^2} + {x^2}} \over { { {(2 - z)}^3}}}\)

    设方程\(z^2+y^2+z^2 = 4z\)确定函数\(z=z(x,y)\),则\( { { {\partial ^2}z} \over {\partial {x^2}}} =\) A: \( { { { { (2 - z)}^2} + {x^2}} \over { { {(2+ z)}^3}}}\) B: \( { { { { (2 - z)}^2} + {x^2}} \over { { {(2 - z)}^3}}}\) C: \( { { { { (2 - z)}^2} -{x^2}} \over { { {(2 - z)}^3}}}\) D: \( { { { { (2 + z)}^2} + {x^2}} \over { { {(2 - z)}^3}}}\)

  • 2022-06-06 问题

    9. 已知函数$z=z(x,y)$由${{z}^{3}}-3xyz={{a}^{3}}$确定,则$\frac{{{\partial }^{2}}z}{\partial x\partial y}=$( ) A: $\frac{z({{z}^{4}}-2xy{{z}^{2}}-{{x}^{2}}{{y}^{2}})}{{{({{z}^{2}}-xy)}^{3}}}$ B: $\frac{z({{z}^{4}}-2xy{{z}^{2}}-xy)}{{{({{z}^{2}}-xy)}^{2}}}$ C: $\frac{z({{z}^{3}}-2xyz-{{x}^{2}}{{y}^{2}})}{{{({{z}^{2}}-xy)}^{3}}}$ D: $\frac{z({{z}^{3}}-2xy{{z}^{2}}-{{x}^{2}}y)}{{{({{z}^{2}}-xy)}^{3}}}$

    9. 已知函数$z=z(x,y)$由${{z}^{3}}-3xyz={{a}^{3}}$确定,则$\frac{{{\partial }^{2}}z}{\partial x\partial y}=$( ) A: $\frac{z({{z}^{4}}-2xy{{z}^{2}}-{{x}^{2}}{{y}^{2}})}{{{({{z}^{2}}-xy)}^{3}}}$ B: $\frac{z({{z}^{4}}-2xy{{z}^{2}}-xy)}{{{({{z}^{2}}-xy)}^{2}}}$ C: $\frac{z({{z}^{3}}-2xyz-{{x}^{2}}{{y}^{2}})}{{{({{z}^{2}}-xy)}^{3}}}$ D: $\frac{z({{z}^{3}}-2xy{{z}^{2}}-{{x}^{2}}y)}{{{({{z}^{2}}-xy)}^{3}}}$

  • 2022-06-16 问题

    \( xoz \) 坐标面上的直线\( x = z - 2 \)绕\( z \)轴旋转而成的圆锥面的方程为( ) A: \( {x^2} - {y^2} = {(z - 2)^2} \) B: \( {x^2} + {y^2} = {(z - 2)^2} \) C: \( {z^2} + {y^2} = {(x - 2)^2} \) D: \( {z^2} + {x^2} = {(y - 2)^2} \)

    \( xoz \) 坐标面上的直线\( x = z - 2 \)绕\( z \)轴旋转而成的圆锥面的方程为( ) A: \( {x^2} - {y^2} = {(z - 2)^2} \) B: \( {x^2} + {y^2} = {(z - 2)^2} \) C: \( {z^2} + {y^2} = {(x - 2)^2} \) D: \( {z^2} + {x^2} = {(y - 2)^2} \)

  • 2021-04-14 问题

    带壁柱墙的高厚比验算公式为β=H0/hT≤μ1μ2[β],其中hT采用

    带壁柱墙的高厚比验算公式为β=H0/hT≤μ1μ2[β],其中hT采用

  • 2021-04-14 问题

    【简答题】设 z 1 =4 + 3i , z 2 =2 - 3i ,计算 z 1 · z 2

    【简答题】设 z 1 =4 + 3i , z 2 =2 - 3i ,计算 z 1 · z 2

  • 2022-05-31 问题

    1)z^2=z拔(2)z^2+|z|=0

    1)z^2=z拔(2)z^2+|z|=0

  • 2022-05-26 问题

    以点\( (2, - 1,2) \)求球心,3为半径的球面方程为( ) A: \( {(x + 2)^2} + {(y - 1)^2} + {(z + 2)^2} = 9 \) B: \( {(x + 2)^2} + {(y - 1)^2} + {(z + 2)^2} = 3 \) C: \( {(x - 2)^2} + {(y + 1)^2} + {(z - 2)^2} = 9 \) D: \( {(x - 2)^2} + {(y + 1)^2} + {(z - 2)^2} = 3 \)

    以点\( (2, - 1,2) \)求球心,3为半径的球面方程为( ) A: \( {(x + 2)^2} + {(y - 1)^2} + {(z + 2)^2} = 9 \) B: \( {(x + 2)^2} + {(y - 1)^2} + {(z + 2)^2} = 3 \) C: \( {(x - 2)^2} + {(y + 1)^2} + {(z - 2)^2} = 9 \) D: \( {(x - 2)^2} + {(y + 1)^2} + {(z - 2)^2} = 3 \)

  • 2022-06-10 问题

    信号$x[n]=(n-3)u(n)$的Z变换结果是 A: $\frac{1}{z^2(z-1)^2}$ B: $\frac{1}{z^2(z-1)}$ C: $\frac{1}{z(z-1)^2}$ D: $\frac{1}{z^2(z+1)^2}$

    信号$x[n]=(n-3)u(n)$的Z变换结果是 A: $\frac{1}{z^2(z-1)^2}$ B: $\frac{1}{z^2(z-1)}$ C: $\frac{1}{z(z-1)^2}$ D: $\frac{1}{z^2(z+1)^2}$

  • 2022-06-01 问题

    若复数z满足:z+.z=2,z?.z=2,则|z-.z|=______.

    若复数z满足:z+.z=2,z?.z=2,则|z-.z|=______.

  • 2021-04-14 问题

    若复数z 1=1+i ,z 2=3-i ,则z 1·z 2等于

    若复数z 1=1+i ,z 2=3-i ,则z 1·z 2等于

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