The position of a particle at time `t` is given by the relation `x (t) = (v_(0))/(A) (1 - e^(-At))`, where `v_(0)` is constant and `A gt 0`. The dimensions of `v_(0)` and `A` respectively

The position of a particle at time t is given by the relation x(t)=(v_(0)/alpha)(1-e^(-alphat)) where v_(0) is a constant and alpha gt 0 . Find the dimensions of v_(0) and alpha

The position of a particle at time t is given by the relation x(t)=(v_(0)/alpha)(1-e^(-alphat)) where v_(0) is a constant and alpha gt 0 . Find the dimensions of v_(0) and alpha

The positive of a particle at time t is given by the relation x(t)=((v_(0))/(alpha))(1-c^(-alphat)) , where v_(0) is a constant and alpha gt 0 The dimensions of v_(0) and alpha are respectively

The position of a particle at time t is given by the relation x(t) = ( v_(0) /( alpha)) ( 1 - c^(-at)) , where v_(0) is a constant and alpha gt 0 . Find the dimensions of v_(0) and alpha .

The position of a particle at time t is given by the relation x(t) = ( v_(0) /( alpha)) ( 1 - c^(-at)) , where v_(0) is a constant and alpha gt 0 . Find the dimensions of v_(0) and alpha .

The position of a particle at time t is given by the relation x(t) = ( v_(0) /( alpha)) ( 1 - c^(-at)) , where v_(0) is a constant and alpha gt 0 . Find the dimensions of v_(0) and alpha .

The position of a particle at time t, is given by the equation, x(t) = (v_(0))/(alpha)(1-e^(-alpha t)) , where v_(0) is a constant and alpha gt 0 . The dimensions of v_(0) & alpha are respectively.

The position of a particle at time t , is given by the relation : x(t) = ((v_(0))/(alpha)) (1 - e^(-alpha t)) where upsilon_(v) is a constant alpha gt 0 . The dimensions of upsilon_(0) and alpha are respectively .