A particle moves in a circle of radius `2 cm` at a speed given by `v = 4t`, where `v` is in `cm s^-1` and `t` is in seconds. (a) Find the tangential acceleration at `t = 1 s` (b) Find total acceleration at `t = 1 s`.

A particle moves in a circle of radius `2 cm` at a speed given by `v =

1.	A particle moves in a circle of radius `2 cm` at a speed given by `v = 4t`, where `v` is in `cm s^-1` and `t` is in seconds. (a) Find the tangential acceleration at `t = 1 s` (b) Find total acceleration at `t = 1 s`.
Answer» Given, v = 4t Radial acceleration, `a_(r)=(v^(2))/(R)=((4t)^(2))/(R)" or "a_(r)=(16r^(2))/(2)=8t^(2)` At t = 1 s, `a_(r)=8cms^(-2)` (i) Tangential acceleration, `a_(t)=(dv)/(dt)` or `a_(t)=(d)/(dt)(4t)=4cms^(-2)` i.e., `a_(t)` is constant or tangential acceleration at t = 1 s is `4cms^(-2)`. Total acceleration, `a=sqrt(a_(t)^(2)+a_(r)^(2))` or `a=sqrt((4)^(2)+(8)^(2))=sqrt(80)=sqrt3cms^(-2)`

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