Calculate height (Approx) of atmosphere considering density of atmosphere is uniform ` (rho = 1.3 kg//m^3)`

Calculate the molarity of water if its density is 1000 kg//m^(3) .

Calculate the molarity of water if its density is 1000 kg m^(-3)

What would be the height of the atmosphere if the air density (a) were uniform and (b) decreased linearly to zero with height? Assume that at sea level the air pressure is 1.0 atm and the air density is 1.3 kg/ m^(3)

A soap bubble has radius R and thickness of its wall is a. Calculate the apparent weight (= true weight - Buoyancy) of the bubble if surface tension of soap solution and its density are T and d respectively. The atmospheric pressure is P_(0) and density of atmospheric air is rho_(0) . By assuming a = 10^(–6) m, R = 10 cm, P_(0) = 10^(5) Nm^(–2), rho_(0) = 1.2 kg m^(–3), d = 10^(3) kg m^(–3), T = 0.04 Nm^(–1) , show that the weight of the bubble is mainly because of water in the skin. What is weight of the bubble?

Calculate the most probable, the mean, and the root mean square velocities of a molecule of a gas whose density under standard atmospheric pressure is equal to rho = 1.00 g//1 .

Assuming that the atmosphere has the same density anywhere as at sea level (rho =1.3 kgm^(-3)) and g to be constant (g=10 ms^(-2)) . What should be the approximate height of atmosphere ? (rho_(0)=1.01xx10^(5)Nm^(-2))