Home
Class 12
MATHS
Show that the differential equation (x e...

Show that the differential equation `(x e^((y)/(x)) + y) dx = x dy` is homogeneous differential equation.

Promotional Banner

Topper's Solved these Questions

  • MODEL TEST PAPER -1

    ICSE|Exercise Section - B|10 Videos

  • MODEL TEST PAPER -1

    ICSE|Exercise Secton - C|11 Videos

  • MODEL TEST PAPER - 8

    ICSE|Exercise Section - C |6 Videos

  • MODEL TEST PAPER -19

    ICSE|Exercise SECTION A|1 Videos

Similar Questions

Explore conceptually related problems

Show that the differential equation x^(2)(dy)/(dx) = x^(2)+ xy + y^(2) is homogeneous differential equation. Also find its general solution.

Show that the differential equation (y sin^(2)((x)/(y))-x)dy+ydx = 0 is homogeneous differential equation. Also find its general solution.

Show that the differential equation ((x-y)dy)/(dx)=x+2y , is homogeneous and solve it.

Solve the differential equation: (x+3y^2)(dy)/(dx)=y

Solve the differential equation (x+y)dy=(x-y)dx

Show that the differential equation (x^(2)+xy)dy=(x^(2)+y^(2))dx is homogenous and solve it.

solve the differential equation (y + x)(dy)/(dx)=y-x

Solve the differential equation: (dy)/(dx)+y/x=x^2

Solve the differential equation y+x dy/dx=x

Solve the differential equation (y+3x^2)(dx)/(dy)=x .