微分方程^11-2(1-(tan )^2x)=0的通解为^11-2(1-(tan )^2x)=0A.^11-2(1-(tan )^2x)=0B.^11-2(1-(tan )^2x)=0C.^11-2(1-(tan )^2x)=0D.^11-2(1-(tan )^2x)=0

4.单选题(5分)-|||-7.5.56-|||-微分方程 ''+(y)^2=y'(e)^-2y 满足条件-|||-.y(0)=0 , y'(0)=-1-|||-的解为 ()-|||-A. =dfrac (1)(2)ln (1-2x)-|||-B. =dfrac (1)(2)ln (1+2x)-|||-C. =dfrac (1)(2)(e)^2x-dfrac (1)(2) .-|||-D. =dfrac (1)(2)-dfrac (1)(2)(e)^2x-|||-A A-|||-B B-|||-C C-|||-D D

7.4.23 方程 (dy)/(dx) - (2y)/(x+1) = (x+1)^5/2的通解为() A. y = (2)/(3)(x+1)^2 [(x+1)^3/2 + C] B. y = (x+1)^w [ (2)/(3)(x+1)^2 + C] C. y = (x+1)^2 [ (2)/(3)(x+1)^3/2 + C] D. y = (x+1)^3 [ (2)/(3)(x+1)^1/2 + C]

∥1(x+1)^2+(y-1)^2]dxdydz= () ,Ω是由 ∥1(x+1)^2+(y-1)^2]dxdydz= () ,Ω 及平面 z=1 所围成的闭区域。∥1(x+1)^2+(y-1)^2]dxdydz= () ,Ω

已知函数 =(x)^3y+3(x)^2(y)^2-x(y)^3 ,则 =(x)^3y+3(x)^2(y)^2-x(y)^3 ( ) A =(x)^3y+3(x)^2(y)^2-x(y)^3 B =(x)^3y+3(x)^2(y)^2-x(y)^3C =(x)^3y+3(x)^2(y)^2-x(y)^3 D=(x)^3y+3(x)^2(y)^2-x(y)^3

已知 L 为内摆线 x^2/3 + y^2/3 = a^2/3 (a > 0) 的弧,计算 int_(L) (x^4/3 + y^4/3), ds = ( ) A. 4a^7/3B. a^7/3C. 3a^7/3D. 4a

(x,y,z)=(x)^3+4(y)^3+4(z)^2,则(x,y,z)=(x)^3+4(y)^3+4(z)^2()。(x,y,z)=(x)^3+4(y)^3+4(z)^2(x,y,z)=(x)^3+4(y)^3+4(z)^2(x,y,z)=(x)^3+4(y)^3+4(z)^2(x,y,z)=(x)^3+4(y)^3+4(z)^2

设L是xOy平面上沿顺时针方向绕行的简单闭曲线,且 oint_(L) (x-2y), dx + (4x+3y), dy = -9, 则L所围成的平面闭区域D的面积等于() A. (3)/(2)B. (1)/(2)C. 2D. (3)/(4)

设 (x)=dfrac ({e)^x-b}((x-a)(x-b)) 有无穷间断点 =e, 可去间断点 =1, 则 (a,b)= __

oint_(Gamma) dx - dy + ydz = ( ),其中 Gamma 为有向闭折线 ABCA,这里 A、B、C 依次为点 (1,0,0),(0,1,0) 和 (0,0,1)。 A (1)/(2) B (3)/(2) C 1 D 2

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