Given s(t)= -t^3+2t^2+(3/2) be the position of a particle moving along the x-axis at time t. At what time will the instantaneous velocity equal the average velocity over the time interval (0,4)?

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asked Sep 24, 2022 204k views

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Given s(t)= -t^3+2t^2+(3/2) be the position of a particle moving along the x-axis at time t. At what time will the instantaneous velocity equal the average velocity over the time interval (0,4)?

Mathematics
high-school

BeauXjames asked

by BeauXjames

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1 Answer

2 votes

Answer:
$(16)/(9)\ s$

Explanation:

Given

s(t)=-t^3+2t^2+(3)/(2)

Average velocity is given by

$v_(avg)=(\int vdt)/(\int dt)$

$v_(avg)=(-(t^4)/(4)+(2)/(3)t^3+1.5t)/(t)\\\\v_(avg)=-(t^3)/(4)+(2)/(3)t^2+1.5$

Now, equate the average and instantaneous velocity

$-(t^3)/(4)+(2)/(3)t^2+1.5=-t^3+2t^2+1.5\\\\\Rightarrow -(3t^3)/(4)+(4t^2)/(3)=0\\\\\Rightarrow t^2\left(-(3)/(4)t+(4)/(3)\right)=0\\\\\Rightarrow t=(16)/(9)\ s$