How do I find the derivative of #y=arcsin(e^x)#?

1 Answer
mason m
Nov 22, 2015

#(e^x)/(sqrt(1-e^(2x))#

Explanation:

Know that #d/dx[arcsin(u)]=(u')/(sqrt(1-u^2)#.

#y'=(d/dx[e^x])/(sqrt(1-(e^x)^2))=(e^x)/(sqrt(1-e^(2x))#

If you didn't already know that #d/dx[arcsin(u)]=(u')/(sqrt(1-u^2)# or want to know how to derive it, just tell me and I'll be happy to elaborate.

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