Question #64fc4

1 Answer
Callum H.
Dec 17, 2014

This will require the application of the chain rule.
First we see that d/dx(blob)^2=2(blob)*(dblob)/dxddx(blob)2=2(blob)dblobdx where blob is anything you can possibly imagine.
So we have y'=2ln(1+e^x)*d/dx(ln(1+e^x))

Next, d/dx(ln(1+e^x))=1/(1+e^x) * e^x
because the derivative of e^x=e^x

So putting everything together,

y'=(2ln(1+e^x)*e^x)/(1+e^x)

Finding y'' is more tricky because we will need to use quotient rule.
Remember, "Lowdeehi minus hideelow all over low squared."

y''=[(1+e^x)*d/dx(2ln(1+e^x)*e^x)-2ln(1+e^x)*e^(2x)]/(1+e^x)^2
d/dx(2ln(1+e^x)*e^x)=2ln(1+e^x)*e^x+(2e^(2x))/(1+e^x)

={(1+e^x)[2ln(1+e^x)*e^x+(2e^(2x))/(1+e^x)]-2ln(1+e^x)*e^(2x)}/(1+e^x)^2

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