What are the variables in the formula `T=2pisqrt((l)/(g))`?

What are the variables in the formula T= 2pi sqrt((l)/(g)) ?

What are the variables in the formula A=pir^(2) ?

What are the variable in the formula A = pi r^(2) ?

The period of a simple pendulum for large deflection angles may be determined from the approximate formula T=2pisqrt((l)/(g))(1+(1)/(4)sin^(2)""(alpha_(0))/(2)) Compare with the result of numerical calculations for the previous problem.

Check the accuracy of the relation T=2pisqrt((L)/(g)) for a simple pendulum using dimensional analysis.

The time period of a simple pendulum is given by the formula, T = 2pi sqrt(l//g) , where T = time period, l = length of pendulum and g = acceleration due to gravity. If the length of the pendulum is decreased to 1/4 of its initial value, then what happens to its frequency of oscillations ?

The number of variables in the formula S=ut+ (at^(2))/(2) is__.