`xsqrt(1-y^(2))dx+ysqrt(1+x^(2))dy=0`

General solution of x sqrt(1-y^(2))dx-ysqrt(1-x^(2))dy=0 is

xsqrt(y^(2)-1)dx-ysqrt(x^(2)-1)dy=0

The solution of the differential equation xsqrt(1-y^(2)) dx+y sqrt(1-x^(2)) dy = 0

Sin^(-1)(xsqrt(1-y^(2))+ysqrt(1-x^(2)))=

If xsqrt(1-y^(2))+ysqrt(1-x^(2))=k , find [(d^(2)y)/(dx^(2))]_(x=0)

Show that the general solution of the differential equation sqrt(1-x^(2))dy+sqrt(1-y^(2))dx=0 is xsqrt(1-y^(2))+ysqrt(1-x^(2))=c , where c is an arbitray constant.

ysqrt(1-x^(2)) dy + x sqrt(1-y^(2)) dx=0