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Grade 10Mechanics

Wheel A of radius rA = 10.0 cm is coupled by a belt B to wheel C of radius rC = 25.0 cm, as shown in Fig.
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
Wheel A increases its angular speed from rest at a uniform rate of 1.60 rad/s2, Determine the time for wheel C to reach a rotational speed of 100 rev/min, assuming the belt does not slip. (Hint: If the belt does not slip, the linear speeds at the rims of the two wheels must be equal.)

Profile image of Hrishant Goswami
11 Years agoGrade 10
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2 Answers

Profile image of Aditi Chauhan
11 Years ago
236-411_1.PNG
Profile image of ng29
11 Years ago
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