A particle moves in the x-y plane with the velocity `bar(v)=ahati-bthatj`. At the instant `t=asqrt3//b` the magnitude of tangential, normal and total acceleration are _&_.

A particle moves in the x-y plane with the velocity vec v = ahat i - bt hat j . At the instant t =asqrt(3)//b the magnitude of tangential, normal and total acceleration are ….. &…….

The velocity varies with time as vecv = ahati + bthatj , where a and b are positive constants. The magnitude of instantaneous velocity and acceleration would be

The velocity varies with time as vecv = ahati + bthatj , where a and b are positive constants. The magnitude of instantaneous velocity and acceleration would be

A particle is moving with a velocity of vec(v)=(3hat(i)+4that(j))m//s . Find the ratio of tangential acceleration to that of total acceleration at t=1sec

A particle is moving along a circular path ofradius R in such a way that at any instant magnitude of radial acceleration & tangential acceleration are equal. 1f at t = 0 velocity of particle is V_(0) . Find the speed of the particle after time t=(R )//(2V_(0))

A particle is moving along a circular path ofradius R in such a way that at any instant magnitude of radial acceleration & tangential acceleration are equal. 1f at t = 0 velocity of particle is V_(0) . Find the speed of the particle after time t=(R )//(2V_(0))

A particle is moving along a circular path ofradius R in such a way that at any instant magnitude of radial acceleration & tangential acceleration are equal. 1f at t = 0 velocity of particle is V_(0) . Find the speed of the particle after time t=(R )//(2V_(0))

An object is moving in x-y plane its velocity and acceleration at t=0 are represented in figure. The ratio of magnitude of velocity to magnitude of component of acceleration along velocity at t=0 :-