The time dependence of physical quantity p is given by `p = p_(0)` exp `(-alphat^(2))`, where `alpha` is a constant and t is the time. The constant `alpha`

The time dependence of a physical quantity P is given by P=P_(0) exp (-alpha t^(2)) , where alpha is a constant and t is time. The constant alpha

The time dependence of a physical quantity P is given by P=P_(0) exp (-alpha t^(2)) , where alpha is a constant and t is time. The constant alpha

The time dependence of a physical quantity P is given by P = P_(0)e^(-alpha t^(2)) , where alpha is a constant and t is time . Then constant alpha is//has

The time dependence of a physical quantity P is given by P=P_0 exp(prop t^2) , where prop is constant prop is represented as [M^0 L^x T^(-2)] . Find x

In the adjacent figure, the mutual inducatance of the infinite straight wire and the coil is M, while the self inductance of the coil is L. The current in infinite wire is varying according to the realtion l_(1) = alphat , where alpha is a constant and t is the time. The time dependence of current in the coil is

The force of interaction between two atoms is given by F= alpha beta exp(-(x^2)/(alphakt)) , where x is the distance ,k is the Boltzmann constant and T is temperature and alpha " and " beta are two constans. The dimension of beta is :

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 .

Energy due to position of a particle is given by, U=(alpha sqrty)/(y+beta) , where alpha and beta are constants, y is distance. The dimensions of (alpha xx beta) are

If force (F) is given by F = Pt^(-1) + alpha t, where t is time. The unit of P is same as that of