Find the average value h_{ave} of the function h on the given interval. NS

khi1la2f1qv

khi1la2f1qv

Answered question

2021-11-16

Find the average value have of the function h on the given interval.
h(x)=8cos4(x)sin(x),[0,π]

Answer & Explanation

Mary Darby

Mary Darby

Beginner2021-11-17Added 11 answers

The given function h and the interval is,
h(x)=8cos4(x)sin(x),[0,π]
The average value of the function in the given interval is computed as follows.
have=1π00π8cos4(x)sin(x)dx
=8π0πcos4(x)sin(x)dx
=8π11u4du
Further evaluate the integral by using the property of the integrals as shown below.
have=8π11u4du
=8π(25)
=165π
Drood1980

Drood1980

Beginner2021-11-18Added 16 answers

Consider the function
h(x)=8cos4xsinx
The average value of the function in the interval [0,π] is given by
have=1π00πh(x)dx
Hence,
have=1π00π8cos4xsinxdx
have=1π118t4dt
have=85π[t5]11
have=165π
Hence, the average value of the functions is have=165π

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