At a constant pressure P, the plot of v...

At a constant pressure P, the plot of volume (V) as a function of temperature (T) for 2 moles of an ideal gas gives a straight line with a slope 0.328 L `K^(-1)`. The value of P (in atm) is closest to [Gas constant, R = 0.0821 L atm `mol^(-1)" "K^(-1)`]

A

0.25

B

0.5

C

1

D

2

Text Solution

Verified by Experts

The correct Answer is:

B

PV = nRT`
rArr V/T = (nR)/(P)` = slope
`rArr P = (nR)/("slope") = (2 xx 0.0821)/(0.328) = 0.5`

Similar Questions

Explore conceptually related problems

The volume of 2.8g of CO at 27^(@)C and 0.821 atm pressure is (R=0.0821 lit. atm mol^(-1)K^(-1))

Half mole of an ideal monoatomic gas is heated at constant pressure of 1 atm from 20^(@)C " to " 90^(@)C . Work done by gas is close to: (Gas constant R = 8.31 J/mol-K)

If two moles of an ideal gas at 500 K occupies a volume of 41 litres, the pressure of the gas is (R = 0.082 L atm K^(-1) mol^(-1))

For the given isotherm (P in atm and V in L) for one mole of an ideal gas, which follows Boyle's law, what will be the approx value of temperature ? (R = 0.0821 L "atm"//"mol" K)

For one mole of a van der Waals' gas when b=0 and T=300K , the pV vs 1//V plot is shown below. The value of the vander Waals' constant a (atm L mol^(-2) )

At a constant pressure P, the plot of volume (V) as a function of temperature (T) for 2 moles of an ideal gas gives a straight line with a slope 0.328 L `K^(-1)`. The value of P (in atm) is closest to [Gas constant, R = 0.0821 L atm `mol^(-1)" "K^(-1)`]

Text Solution

Similar Questions

Recommended Questions