Answer to Question #313956 in Physics for abby

Question #313956

The angular position of a point on a rotating wheel is given by θ = 3.04 + 4.83t² + 2.99t³, where θ is in radians and t is in seconds. At t = 0, what are (a) the point's angular position and (b) its angular velocity? (c) What is its angular velocity at t = 7.43 s? (d) Calculate its angular acceleration at t = 1.12 s. (e) Is its angular acceleration constant?

Expert's answer

Given:

"\\theta = 3.04 + 4.83t^2 + 2.99t^3"

(a)

"\\theta(0) = 3.04 \\:\\rm rad"

(b)

"\\omega=\\frac{d\\theta}{dt} = 9.66t+ 8.97t^2"

"\\omega(0) =0"

(c)

"\\omega(7.43)= 9.66\\times 7.43+ 8.97\\times 7.43^2\\\\\n=567\\:\\rm rad\/s"

(d)

"\\alpha=\\frac{d\\omega}{dt} = 9.66+ 17.9t"

"\\alpha(1.12)= 9.66+ 17.9\\times 1.12=29.8\\:\\rm rad\/s^2"

(e) no

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Answer to Question #313956 in Physics for abby

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