the integration factor of : (1+5xy^2)dx+(x^2)ydy=0

Evaluate the integral by reversing the order of integration. 2 0 2 6ex/y dy dx x

Evaluate the integral by reversing the order of integration. 2 0 2 6ex/y dy dx x

Evaluate the line integral: (x^2 + y^2) dx + (5xy) dy on the edge of the...

Evaluate the line integral: (x^2 + y^2) dx + (5xy) dy on the edge of the circle: x^2 + y^2 = 4. USING GREEN'S THEOREM.

integration of (x^5)/(x^2+sqrt(2))dx

integration of (x^5)/(x^2+sqrt(2))dx

In determining the integration factor(3), we did not use a constant of integration in the evaluation...

In determining the integration factor(3), we did not use a constant of integration in the evaluation of ∫ P(x) dx. Explain why using ∫ P(x)dx+c1 has no effect on the solution of (2).

(x^2+y^2)dx-2xydy=0 is nonexact find the integrating factor

(x^2+y^2)dx-2xydy=0 is nonexact find the integrating factor

X^2y’’ − 5xy’ + 8y = 8x^6; y(1/2) = 0; y’ (1/2) = 0 differential equation...

X^2y’’ − 5xy’ + 8y = 8x^6; y(1/2) = 0; y’ (1/2) = 0 differential equation using the Cauchy-Euler method

integration by partial fraction decomposition from -2 to 2. (x^3+2)/((x+5)(x+4))dx

integration by partial fraction decomposition from -2 to 2. (x^3+2)/((x+5)(x+4))dx

Solve: 1.dy/dx=(e^(y-x)).secy.(1+x^2),y(0)=0.    2.dy/dx=(1-x-y)/(x+y),y(0)=2 .

Solve: 1.dy/dx=(e^(y-x)).secy.(1+x^2),y(0)=0.    2.dy/dx=(1-x-y)/(x+y),y(0)=2 .

method of separation of variables.(x2y+ 2xy+ 5y)dy= (y2+ 7)dx2 integration factor. xdy/dx−2y=x4sinx3. variation of parameters: y′−y=xex/x+1

method of separation of variables.(x2y+ 2xy+ 5y)dy= (y2+ 7)dx2 integration factor. xdy/dx−2y=x4sinx3. variation of parameters: y′−y=xex/x+1

Find an integrating factor and solve the O.D.E. 1 + (x/y − sin(y) *dy/dx = 0.

Find an integrating factor and solve the O.D.E. 1 + (x/y − sin(y) *dy/dx = 0.