Question

∫−2,−∞ (e^(2x))/(1+e^(2x)) dx

∫−2,−∞ (e^(2x))/(1+e^(2x)) dx

Homework Answers

Know the answer?
Your Answer:

Post as a guest

Your Name:

What's your source?

Earn Coins

Coins can be redeemed for fabulous gifts.

Not the answer you're looking for?
Ask your own homework help question
Similar Questions
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.
1. Integral sin(x+1)sin(2x)dx 2.Integral xe^x dx 3. integral ln sqrt(x) dx 4. integral sqrt(x) lnx dx
1. Integral sin(x+1)sin(2x)dx 2.Integral xe^x dx 3. integral ln sqrt(x) dx 4. integral sqrt(x) lnx 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.
ADVERTISEMENT
Need Online Homework Help?

Get Answers For Free
Most questions answered within 1 hours.

Ask a Question
ADVERTISEMENT