Answer to Question #245754 in Other for Mohammed

Question #245754

A racing car moves on a circular track of radius b. The car starts from rest and its speed increases at a constant rate "\\alpha". Find the angle between its velocity and acceleration vectors at time t.

Expert's answer

"|a_{\\tau}|=\\alpha, v=\\alpha t"

"|a_r|=\\dfrac{v^2}{b}=\\dfrac{\\alpha^2t^2}{b}"

"|a|=\\sqrt{(\\alpha)^2+(\\dfrac{\\alpha^2t^2}{b})^2}"

"\\cos\\theta=\\dfrac{|a_{\\tau}|}{|a|}=\\dfrac{\\alpha}{\\sqrt{(\\alpha)^2+(\\dfrac{\\alpha^2t^2}{b})^2}}"

"=\\dfrac{b}{\\sqrt{b^2+\\alpha^2t^4}}"

"\\theta=\\cos^{-1}(\\dfrac{b}{\\sqrt{b^2+\\alpha^2t^4}})"

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Answer to Question #245754 in Other for Mohammed

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