Let the solution of y log ydx+(x-log y)d...

Let the solution of `y log ydx+(x-log y)dy=0` is `x.log y=A(log y)^(2)+c` where `c` is constant then `A=?`

Promotional Banner

Promotional Banner

Similar Questions

Explore conceptually related problems

y log ydx-xdy=0

Solution of the equation (x+log y)dy+ydx=0 is

For relation 2 log y - log x - log ( y-1) =0

y log y (dx)/(dy) + x - log y =0

Solution of the equation (x+log y ) dy + y dx =0 is

The solution of the DE (dy)/(dx) + y log y cot x = 0 is

(x log x ) (dy)/(dx) + y = 2 log x

The solution of (dy)/(dx)+(y)/(x)=(1)/((1+log x+log y)^(2)) is given by

If y log x=x-y prove that (dy)/(dx)=(log x)/((1+log x)^(2))

Recommended Questions

Let the solution of y log ydx+(x-log y)dy=0 is x.log y=A(log y)^(2)+c ...
Text Solution
|
Solution of the equation (x+log y)dy+ydx=0 is
Text Solution
|
(x + ln y) dy + ydx = 0
Text Solution
|
The solution of the differential equation (dy)/(dx)=(x^2+x y+y^2)/(x^2...
Text Solution
|
The solution of dy/dx+(xy^2-x^2y^3)/(x^2y+2x^3y^2)=0, is (A) log(y^2/x...
Text Solution
|
y log ydx-xdy=0
Text Solution
|
y = log x + c is a solution of the differential equation x(d^(2)y)/(...
Text Solution
|
y log y (dx)/(dy) + x - log y =0
Text Solution
|
(dy)/(dx)=(xy)/((1-x)(1+y)) A) x+y+log[y(1-x)]=c B) x+y+log[x(1-y)]=c ...
Text Solution
|