Evaluate the integral? : int_(-1)^1 coshx dx

1 Answer
Steve M
Dec 15, 2016

int_(-1)^1 coshx dx = e-1/e " "(~~2.35040)

Explanation:

coshx is an even function so its is symmetrical about Oy
graph{cosh x [-10, 10, -5, 5]}
So, int_(-1)^1 coshx dx=2 int_0^1 coshx dx

If we go back to the definition of cosh x=1/2(e^x+e^-x) we have:

int_(-1)^1 coshx dx = 2 int_0^1 1/2(e^x+e^-x) dx
" " = int_0^1 (e^x+e^-x) dx
" " = [e^x-e^-x]_0^1
" " = (e^1-e^-1) - (e^0-e^0)
" " = e-1/e " "(~~2.35040)

We could also use the fact that int coshx=sinhx + C

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