Test dimensionally if the `v^2=u^2+2ax` may be correct.

Test dimensionally if the formula t= 2 pi sqrt(m/(F/x)) may be corect where t is time period, F is force and x is distance.

The dimensional formula of mc^(2) is :

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

Check the correctness of the equation W=1/2mv^(2)-1/2"mu"^(2) using the dimensional analysis, where W is the work done, m is the mass of body,u-its initial velocity and v its final velocity.

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.

Which of the following equations is dimensionally incorrect ? (E= energy, U= potential energy, P=momentum, m= mass, v= speed)

You may not know integration , but using dimensional analysis you can check on some results . In the integral int ( dx)/(( 2ax - x^(2))^(1//2)) = a^(n) sin^(-1) ((x)/(a) -1) , find the valiue of n .

Check the correctness of the following equation by the method of dimensions (i) v^(2)=u^(2)+2gs (ii) s=ut+1/2"gt"^(2) (iii) v=u+"gt"

According to Bernoullis theoram p/d + (v^2)/2 + gh = constant, dimensional formula of the constant.

Given that int (dx)/(sqrt(2 ax - x^2)) = a^n sin^(-1) ((x-a)/(a)) where a is a constant. Using dimensional analysis. The value of n is