How do you find the area of the region bounded by the given curves?

#y=1/x, y=x^2, y=0, x=e#
You are suppose to use integration, but I do not know how to start the problem.

1 Answer
Oct 31, 2017

Graph the 4 boundaries.
Find the x coordinates of the intersect points.
Write the definite integrals for the region

Explanation:

Blue #y = x^2#

Red: #y = 1/x#

Green: #y = 0#

Orange: #x = e#

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Find x coordinates of the intersect point(s):

#0 = x^2#

#x = 0#

#x^2 = 1/x#

#x^3 = 1#

#x = 1#

#x = e#

The integrals are:

#"Area" = int_0^1x^2 dx+int_1^e1/x dx#

#"Area" = [x^3/3]_0^1+ [ln(x)]_1^e#

#"Area" = 4/3#