(x^(2)+xy)(dy)/(dx)=x^(2)+y^(2)...

`(x^(2)+xy)(dy)/(dx)=x^(2)+y^(2)`

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The correct Answer is:

`c(x-y)^(2)=|x|e^(-(y)/(x))`

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CHHAYA PUBLICATION-DIFFERENTIAL EQUATIONS OF THE FIRST ORDER AND FIRST DEGREE -PART -C

x(dy)/(dx)=y(logy-logx-1)
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(dy)/(dx)+(y)/(x)=(y^(2))/(x^(2))
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(x^(2)+xy)(dy)/(dx)=x^(2)+y^(2)
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(1)/(2x)(dy)/(dx)+(x+y)/(x^(2)+y^(2))=0
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(dy)/(dx)=(y(2y-x))/(x(2y+x))=0, given y=1, when x=1
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x(x-y)dy+y^(2)dx=0
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y^(2)dx+(x^(2)-xy)dy=0
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x^(2)ydx-(x^(3)+y^(3))dy=0
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(dy)/(dx)=(y)/(x)+cot""(y)/(x)
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(dy)/(dx)=(y)/(x)-tan""(y)/(x)
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x^(2)dy+(x^(2)-xy+y^(2))dx=0
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(x^(2)-2xy)dy+(x^(2)-3xy+2y^(2))dx=0
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y^(2)dx+(x^(2)-xy)dy=0
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(dy)/(dx)=(y(y+x))/(x(y-x))
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xdy-ydx=(x^(2)-3xy+2y^(2))dx=0
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Solve the following differential equation xdy-ydx=sqrt(x^(2)+y^(2))dx
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y^(2)dx+(x^(2)-xy)dy=0
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xy(dy)/(dx)-y^(2)=(x+y)2(e)^(-(y)/(x))
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(x+ycos""(y)/(x))dx=xcos""(y)/(x)dy
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(1+e^((x)/(y)))dx+e^((x)/(y))(1-(x)/(y))dy=0
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