Let us check the dimensional correctness of the relation ` v = u + at`.

Verify the correctness of the equations v = u + at .

Check the dimensional correctness of the following relation. Volume of a sphere = 4/3pi"(radius)"^2

The dimensionally correct formula is

An object acceleraties uniformly from initial velocity u to final velocity v. if travels distance s in time t. Then check the dimensional consistency of the following equations. Which of them are correct physically? (i) v_(av)=(u+v)/3 (ii) s=ut+1/2at^(2) (iii) v^(2)-u^(2)=(2s)/a

Check the dimensional consistency of the equation, force = "(Change in Momentum)"/"Time"

The correct three dimensional presentation of ethane is

Using dimensional analysis check the correctness of the equation T=2pisqrt(l/g) , where T is the period of the simple pendulum of length l and g is the acceleration due to gravity.

A circular railway track of radius r is banked at angle theta so that a train moving with speed v can safely go round the track. A student writes: tan theta =rg//v^(2) . Why this relation is not correct? (i) Equality of dimensions does not guarantee correctness of the relation . (ii) Dimensionally correct relation may not be numerically correct. iii) The relation is dimensionally incorrect.

Check the correctness of the equation 1/2mv^(2)=mgh , using dimensions.

Check the correctness of the equation v=(K eta)/(r rho) using dimensional analysis, where v is the critical velocity eta is the coefficient of viscosity, r is the radius and rho is the density?