At time t in seconds, a particle’s distance s⁢(t), in centimeters, from a point is given by s⁢(t)=13sin⁢ t+40. What is the average velocity of the particle from t⁢= π3 to t⁢= 13π3?

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asked Jul 2, 2021 29.4k views

5 votes

At time t in seconds, a particle’s distance s⁢(t), in centimeters, from a point is given by s⁢(t)=13sin⁢ t+40. What is the average velocity of the particle from t⁢= π3 to t⁢= 13π3?

Physics
college

Malvika asked

by Malvika

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4 votes

Answer:

Step-by-step explanation:

Given

distance
$s(t)=13\sin (t)+40$

at
$t=(\pi )/(3)$

$s((\pi )/(3))=13\sin ((\pi )/(3))+40$

$s((\pi )/(3))=13* (√(3))/(2)+40$

at
$t=(13\pi)/(3)=4\pi+(\pi)/(3)$

$s(4\pi+(\pi)/(3))=13\sin (4\pi+(\pi)/(3))+40$

Average velocity is change in position w.r.t time

$v_(avg)=(s(4\pi+(\pi)/(3))-s((\pi )/(3)))/(4\pi+(\pi)/(3)-(\pi )/(3))$

v_(avg)=0

Graham Giller answered Jul 8, 2021

by Graham Giller

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