∫−2,−∞ (e^(2x))/(1+e^(2x)) dx

Find the solution of the following differential equation: (?^3 y/dx^3)-7(d^2 y/dx^2)+10(dy/dx)=e^2x sinx

Find the solution of the following differential equation: (?^3 y/dx^3)-7(d^2 y/dx^2)+10(dy/dx)=e^2x sinx

intetgral of e^(4x)sin(2x)dx

intetgral of e^(4x)sin(2x)dx

Find the particular integral of the differential equation d2y/dx2 + 3dy/dx + 2y = e −2x...

Find the particular integral of the differential equation d2y/dx2 + 3dy/dx + 2y = e −2x (x + 1). show that the answer is yp(x) = −e −2x ( 1/2 x2 + 2x + 2)

6) Given y = [ e ^ (2x+1) ] / [2 ^ (1 - 3x)], then...

6) Given y = [ e ^ (2x+1) ] / [2 ^ (1 - 3x)], then dy/dx equals:

evaluate the indefinite integral (1+2x)/(1+x^2) dx

evaluate the indefinite integral (1+2x)/(1+x^2) dx

1. the integral of 0 to 1 of (x) / (2x+1)^3 dx 2. the integral of...

1. the integral of 0 to 1 of (x) / (2x+1)^3 dx 2. the integral of 2 to 4 of (x+2) / (x^2+3x-4) dx

I need to find dy/dx if y = (e^(x^2))(x+1)^x my solution is y' = 2x(e^(x^2))(x+1)^x+(e^(x^2))(x+1)^x(ln(x+1)+x/(x+1)) is...

I need to find dy/dx if y = (e^(x^2))(x+1)^x my solution is y' = 2x(e^(x^2))(x+1)^x+(e^(x^2))(x+1)^x(ln(x+1)+x/(x+1)) is that correct. I am using logarithmic differentiation

Evaluate ∫x^2+2x+1/x^3−16x dx.

Evaluate ∫x^2+2x+1/x^3−16x dx.

Solve the differential equation (5x^4 y^2+ 2xe^y - 2x cos (x^2)) dx + (2x^5y + x^2...

Solve the differential equation (5x^4 y^2+ 2xe^y - 2x cos (x^2)) dx + (2x^5y + x^2 e^y) dy = 0.

Solve the equations: dy/dx+(1/x-2x/(1-x^2))*y=1/(1-x^2)

Solve the equations: dy/dx+(1/x-2x/(1-x^2))*y=1/(1-x^2)