The following equation gives a relation between the mass `m_(1)` kept on a surface of area A and the pressure p exerted on this area.
`p=((m_(1)+m_(2))x)/(A)`
What must be the dimensions of the quatities x and `m_(2)`?

If system is in equilibrium then find relation between m_(1) and m_(2)

When force F applied on m_(1) and there is no friction between m_(1) and surface and the coefficient of friction between m_(1)and m_(2) is mu. What should be the minimum value of F so that there is on relative motion between m_(1) and m_(2)

Consider the system of masses and pulleys shown in fig. with massless string and fricitionless pulleys. (a) Give the necessary relation between masses m_(1) and m_(2) such that system is in equilibrium and does not move. (b) If m_(1)=6kg and m_(2)=8kg , calculate the magnitude and direction of the acceleration of m_(1) .

The dimensions of a cuboid are in the ratio 5:3:1 and its total surface area is 414\ m^2dot Find the dimensions.

When a force of one "________" acts on an area of cross-section 1m ^(2), the pressure exerted is said to be one "___________"

Assertion : Mass of solid floating in liquid is m_(1) and mass of liquid is m_(2) . Base area is A. Then pressure at bottom is p_(0) + ((m_(1)+m_(2))g)/(A) Reason : Upward force on liquid from base of vessel is pA, where p is pressure at bottom.

The dimensions of a cuboid are in the ratio of 1:2:3: and its total surface area is 88 m^2dot Find the dimensions.

The dimensions of a cuboid are in the ratio of 1:2:3: and its total surface area is 88 m^2dot Find the dimensions.

What is the area of cross-section of a body in m^(2), when it exerts a force of 50 N and produces a pressure of 2000 Pa?

A cuboid has total surface area of 50\ m^2 and lateral surface area is 30\ m^2dot Find the area of its base.