How do you find the derivative of #y=(e^x+e^-x)/4#?
1 Answer
May 24, 2017
# dy/dx = (e^x-e^(-x))/4 = 1/2sinhx #
Explanation:
We have:
# y = (e^x+e^(-x))/4 #
Differentiating directly:
# dy/dx = (e^x-e^(-x))/4 #
Also, If you are familiar with the hyperbolic functions then we can proceed as follows:
# y = (e^x+e^(-x))/4 #
# \ \ = 1/2 * (e^x+e^(-x))/2 #
# \ \ = 1/2coshx #
and so:
# dy/dx = 1/2sinhx #
