xy’+y
举一反三
- 分解因式()x()3()y()-()2()x()2()y()2()+()xy()3()正确的是A.()xy()(()x()+()y())()2()B.()xy()(()x()2()﹣()2()xy()+()y()2())()C.()xy()(()x()2()+2()xy()﹣()y()2())()D.()xy()(()x()﹣()y())()2
- 设\(z = xy{e^{\sin xy}}\),则\({z'_y} = \)( )。 A: \(x{e^{\sin xy}}\left( {1 + xy\cos xy} \right)\) B: \(y{e^{\sin xy}}\left( {1 + xy\cos xy} \right)\) C: \(x{e^{\sin xy}}\left( {1 + y\cos xy} \right)\) D: \(x{e^{\sin xy}}\left( {1 - xy\cos xy} \right)\)
- 设z=f(xy)/x+yφ(x+y),f、φ具有二阶连续导数,则∂<sup>2</sup>z/∂x∂y=()。 A: yf′(xy)+φ′(x+y)+yφ′′(x+y) B: yf′′(xy)+φ(x+y)+yφ′′(x+y) C: yf′′(xy)+φ′(x+y)+yφ′′(x+y) D: yf′′(xy)+φ′(x+y)+yφ′(x+y)
- 在下图中,已知斜截面上无应力,该x、y面上的应力分量满足关系 ( )[img=363x330]1803be4a6959759.png[/img] A: σx>σy, τyx>τxy B: σx<σy, τxy=τxy C: σx>σy, τyx=τxy D: σx<σy, τyx>τxy
- 设\(z = u{e^v}\),\(u = {x^2} + {y^2}\),\(v = xy\),则\( { { \partial z} \over {\partial x}}=\) A: \({e^{xy}}({x^2}y + {y^3} + 2x)\) B: \({e^{xy}}({x}y^2 + {y^3} + 2x)\) C: \({e^{xy}}({x}y + {y^3} + 2x)\) D: \({e^{xy}}({x^2}y + {y^2} + 2x)\)