`P = P_(0) e^(-(alpha t^(2))`
find dimensions of `alpha`, where P = pressure, t = time.

In the formula P = (nRT)/(V-b)e^(-(a)/(RTV)) , find the dimensions of a and b where P = pressure, n = no. of moles, T = temperature, V = volume and R = universal gas constant.

In the formula , p = (nRT)/(V-b) e ^(a)/(RTV) find the dimensions of a and b, where p = pressure , n= number of moles , T = temperture , V = volume and E = universal gas constant .

In the formula P=(nRT)/(V-b)e^(-a/(RTV)) . Find the dimensions of a and b where P= pressure, n= number of moles. T= temperature, V= volume and R= universal gas constant.

If alpha=F/v^(2) sin beta t , find dimensions of alpha and beta . Here v=velocity, F= force and t= time.

For a moles of gas ,Van der Weals equation is (p = (a)/(V^(-2))) (V - b) = nRT ltbr. Find the dimensions of a a and b , where p = pressure of gas ,V = volume of gas and T = temperature of gas .

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.

A physical quantity Q is given by Q=Q_(0)e^(-alphat^(2)) where t is the time and alpha is a constant. What is the dimensional formula for 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

Find the dimensions of alpha//beta in equation P=(alpha-t^2)/(betax) where P= pressure, x is distance and t is time.

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