累次积分∫01dx∫x1f(x,y)dy+∫12dy∫02—yf(x,y)dx可写成( )
A: ∫02dx∫x2f(x,y)dy
B: ∫01dx∫x2—yf(x,y)dy
C: ∫01dx∫x2—xf(x,y)dy
D: ∫01dx∫y2—yf(x,y)dy
A: ∫02dx∫x2f(x,y)dy
B: ∫01dx∫x2—yf(x,y)dy
C: ∫01dx∫x2—xf(x,y)dy
D: ∫01dx∫y2—yf(x,y)dy
C
举一反三
- 形如( )的方程,称为可分离变量方程,这里\(f(x), g(y)\)分别为\(x, y\)的连续函数。 A: \(\frac{dy}{dx}=f(x)g(y)\) B: \(\frac{dy}{dx}=f(x)\) C: \(\frac{dy}{dx}=f(x)+g(y)\) D: \(\frac{dy}{dx}=\frac{f(x)}{g(y)}\)
- 设函数f(x,y)连续,则∫12dx∫x2f(x,y)dy+∫12dx∫y4—yf(x,y)dy=( ) A: ∫12dx∫14—xf(x,y)dy B: ∫12dx∫x4—xf(x,y)dy C: ∫12dx∫14—xf(x,y)dy D: ∫12dx∫y2f(x,y)dy
- 函数\(z = {x^y}\)的全微分为 A: \(dz = y{x^{y - 1}}dy + {x^y}\ln xdx\) B: \(dz = y{x^{y - 1}}dx + {x^y}dy\) C: \(dz = y{x^{y - 1}}dx + {x^y}\ln xdy\) D: \(dz = y{x^{y - 1}}dy + {x^y}dx\)
- 设函数f(x,y)连续,则∫12dx∫x2f(x,y)dy+∫12dy∫y4-yf(x,y)dx=( ). A: ∫12dx∫14-xf(x,y)dy. B: ∫12dx∫x4-xf(x,y)dy C: ∫12dx∫14-yf(x,y)dy. D: ∫12dx∫yyf(x,y)dy
- 下列方程中,不是全微分方程的为( )。 A: \(\left( {3{x^2} + 6x{y^2}} \right)dx + \left( {6{x^2}y + 4{y^2}} \right)dy = 0\) B: \({e^y}dx + \left( {x \cdot {e^y} - 2y} \right)dy = 0\) C: \(y\left( {x - 2y} \right)dx - {x^2}dy = 0\) D: \(\left( { { x^2} - y} \right)dx - xdy = 0\)
内容
- 0
交换积分次序∫21dy∫2yf(x,y)dx=∫21dx∫x1f(x,y)dy∫21dx∫x1f(x,y)dy.
- 1
一阶微分方程dy/dx=xcos(x^2)/y
- 2
如果y=f(x),则dy= A: deta y B: f’(x) C: f’(x)dx
- 3
已知\( y = {x^2} + 4x \),则\( dy \)为( ). A: \( (2x + 4)dx \) B: \( 2xdx \) C: \( ({x^2} + 4)dx \) D: \( ({x^2} + 4x)dx \)
- 4
y=ln(3x), 则 dy = ( ) A: 1/(3x) dx B: ln3 dx C: 1/x dx D: ln3/x dx