The curve amongst the family of curves represented by the differential equation, (x2−y2)dx+2xydy=0 which passes through (1,1), is :
A
a circle with centre on the x-axis
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B
a circle with centre on the y-axis
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C
an ellipse with major axis along the y-axis
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D
a hyperbola with transverse axis along the x-axis
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Solution
The correct option is A a circle with centre on the x-axis (x2−y2)dx+2xydy=0 ⇒dydx=12[y2−x2xy] ⇒dydx=12yx[1−(xy)2]
Put y=vx∴dydx=xdvdx+v ⇒xdvdx+v=12v(1−1v2) ⇒∫2v1+v2dv=−∫dxx ⇒ln(v2+1)=−lnx+lnC ⇒y2+x2=Cx
Passes through (1,1)
So, C=2 ∴y2+x2=2x ⇒x2+y2−2x=0 ⇒(x−1)2+y2=1
Hence, It is a circle with centre on x−axis.