Home
Class 12
PHYSICS
The equation of state of a gas is given ...

The equation of state of a gas is given by `(P + (a)/(V^(3))) (V-b^(2))=c T`, where P, V, R are pressure, volume and temperature respectively, and a,b,c are constants. The dimensions of a and b are respectively

A

`ML^(8)T^(-2) and L^(3//2)`

B

`ML^(5)T^(-2) and L^(3)`

C

`ML^(5)T^(2) and L^(6)`

D

`ML^(6)T^(-2) and L^(3//2)`

Text Solution

Verified by Experts

Promotional Banner

Topper's Solved these Questions

  • QUESTION PAPER 2013

    WB JEE PREVIOUS YEAR PAPER|Exercise Category-II|10 Videos

  • QUESTION PAPER 2013

    WB JEE PREVIOUS YEAR PAPER|Exercise Category-III|5 Videos

  • QUESTION PAPER 2012

    WB JEE PREVIOUS YEAR PAPER|Exercise Subject: Physics|38 Videos

  • QUESTION PAPER 2014

    WB JEE PREVIOUS YEAR PAPER|Exercise PHYSICS (CATEGORY III)|3 Videos

Similar Questions

Explore conceptually related problems

The equation of state of a gas is given by (p+(a)/V^(3))(V-b^(2))=cT where p, V and T are pressure volume and temperature respectively and a, b,c are constants. The dimensions of a and b are respectively

For real gases van der Waals equation of state can be expressed as (p+(a)/(V^(2)))(V-b)=RT where p is the pressure V is the molar volume and T is the absolute temperature of the given sample of gas and a,b, and R are constants. Dimension of b is

For real gases van der Waals equation of state can be expressed as (p+(a)/(V^(2)))(V-b)=RT where p is the pressure V is the molar volume and T is the absolute temperature of the given sample of gas and a,b, and R are constants. Dimension of a is

For real gases van der Waals equation of state can be expressed as (p+(a)/(V^(2)))(V-b)=RT where p is the pressure V is the molar volume and T is the absolute temperature of the given sample of gas and a,b, and R are constants. Dimension of (ab)/(RT) is

For real gases van der Waals equation of state can be expressed as (p+(a)/(V^(2)))(V-b)=RT where p is the pressure V is the molar volume and T is the absolute temperature of the given sample of gas and a,b, and R are constants. Dimension of RT is the same as that of

For real gases van der Waals equation of state can be expressed as (p+(a)/(V^(2)))(V-b)=RT where p is the pressure V is the molar volume and T is the absolute temperature of the given sample of gas and a,b, and R are constants. Which of the following does not have the same dimension as that of RT?

The velocity V of a particle at time t is given by V = at + b/(t+c) . The dimensions of a, b and c are respectively--------.

The equation of state of a real gas is P(V-b)=RT . Can this gas be liquefied?