A particle moves in a circle of radius 20 cm. Its linear speed is given by v=2t, where t is in second and v in metre/ second. Find the radial and tangential acceleration at t=3s.

A particle moves in a circle of radius 20 cm . Its linear speed is given by v = 2t where t is in seconds and v in m s^-1 . Then

A particle moves in a circle of radius 20 cm . Its linear speed is given by v = 2t where t is in seconds and v in m s^-1 . Then

A particle moves in a circle of radius 30cm . Its linear speed is given by v=2t , where t in second and v in m//s . Find out its radial and tangential acceleration at t=3s .

A particle moves in a circle of radius 30cm . Its linear speed is given by v=2t , where t in second and v in m//s . Find out its radial and tangential acceleration at t=3s .

A particle moves in a circle of radius 20 cm Its linear speed is given by upsilon = 2 t where t is in second and upsilon in metre/second Find the radial and tangential acceleration at t = 3 s .

A particle moves in a circle of radius 10 m. Its linear speed is given by v= 31 where is in second and v is in ms^(-1) . (a) Find the centripetal and tangential acceleration at 1 = 2 s. (b) Calculate the angle between the resultant acceleration and the radius vector.

A particle moves in a circle of radius 20 cm. Its linear speed is given by v = (3t^(2) +5t) where t is in second and v is in m/s. Find the resultant acceleration at t = 1s.

A particle moves in a circle of radius 20 cm. Its linear speed is given by v = (3t^(2) +5t) where t is in second and v is in m/s. Find the resultant acceleration at t = 1s.

A particle moves in a circle of radius 10 m. Its linear speed is given by v=3t where t is the lime in second and v is in ms^(-1) .Compute the centripetal and tangential acceleration at time t = 2s.

A particle moves in a circle of radius 20 cm. Its linear speed is given by v=2t where t is in s and v in m/s. Then a) the radial acceleration at t=2s" is "80ms^(-2) b) tangential acceleration at t-2s" is "2 ms^(-2) c)net acceleration at t=2s is greater than 80 ms^(-2) d) tangential acceleration remains constant in magnitude.