Evaluate the integral? : #int_(-3)^2 1/x^4 dx#
1 Answer
Mar 5, 2017
The integral is divergent and therefore
Explanation:
I recommend that you always draw a sketch to clarify what needs calculating.
graph{1/x^4 [-5, 5, -2, 10]}
The curve has a singularity at
# int_(-3)^2 \ 1/x^4 \ dx = int_(-3)^0 \ 1/x^4 \ dx+int_0^2 \ 1/x^4 \ dx#
# " " = lim_(a rarr 0^-)int_(-3)^a \ 1/x^4 \ dx+ lim_(rarr o^-)int_0^b \ 1/x^4 \ dx#
# " " = lim_(a rarr 0^-) [-1/(3x^3) ]_-3^a #
# " " + lim_(b rarr 0^+) [ -1/(3x^3) ]_(b)^2#
And neither of these limits exist.
