Evaluate the iterated integral \int_{-1}^{2}\int_{0}^{\frac{\pi}{2}}

Cem Hayes

Cem Hayes

Answered question

2021-05-28

Evaluate the iterated integral
120π2

Answer & Explanation

AGRFTr

AGRFTr

Skilled2021-05-29Added 95 answers

Step 1
Iterated integral is integral over several variables such that only one variable is integrated over at one time keeping the other variable as a constant. The iterated integral can be written as a product of two independent integrals if the limits of the integration are constants and the integrand can be separated.
An example of integrand which can be separated is xy. An example of integrand which cannot be separated is sin(xy).
Step 2
Given iterated integral to be computed is 120π2ysinxdxdy. The integrand can be separated and the limits are constants so the integral can be written as product of two integrals: one integrating over x and other integraing over y.
Use this information to compute the integral.
120π2ysinxdxdy=(12ydy)(0π2sinxdx)
=(y22)12(cosx)0π2
=(22(1)22)(cosπ2+cos0)
=321
=32
Hence, the given iterated integral is equal to 32.

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