Solve: (x^2+y^2)dx=2xydy using v=y/x
x = cost, y = Solve S(3x² + y²)dx + 2xydy along the circular arc C are given by sint (osts)
Solve the differensial е чу (x²-3y² ) dx + 2xydy b) Demonstrate whether the given differential equation is exact.If it is exact, Solve it. +y dx dy = 0 y-1 2 y-1
Question 1 (PLO-2,CLO-2,C3)Marks-(12+13 a) Solve the following Differential Equation. (x2 – 3y2)dx + 2xydy = 0 b) Demonstrate whether the given differential equation is exact.If it is exact, Solve it. x+y dx dy = 0 y-1 2 y-1
Which of the following is solution for (x^2 + y^2) dx +2xydy= 0? xy^2+1/3x^3=c x^2y+1/3x^3=c xy^2+1/2x^3=c x^2y+1/2x^3=c
Solve the equation (3x?y - 1)dx + (y - 4x?y-2)dy = 0 is an arbitrary constant, and V by multiplying by the integrating factor. An implicit solution in the form F(x,y) = C is = C, where (Type an expression using x and y as the variables.)
Solve the initial value problem dy dx+2y-4e0y(O)2 The solution is y(x)
Solve the initial value problem dy dx+2y-4e0y(O)2 The solution is y(x)
Solve the following Differential Equation :
=(x + y-1)2 dx
(2x+ 2 x y²) dx + ( x ²) - 3y) dy = 0 solve your equation
Using integrating factor, solve the initial value problem for the following ODE. dy y dx X - 7xe, y(1) = 7e -7 The solution is y(x) = D.
solve using Exact and Non-Exact DE
13. -y dx +(x - x) dy 0 dy 0