The pressure and density of a gas (Ƴ =5/3) changes adiabatically from (p1,d1 ) to (p2,d2).If d2/d1=27 the find value of p2/p1 ?

The pressure and density of a diatomic gas (gamma=7//5) change adiabatically from (p,d) to (p^('),d^(')) . If (d^('))/(d)=32 , then (P^('))/(P) should be

The pressure and density of a diatomic gas (gamma = (7)/(5)) change adiabatically from (P, d) to P', d') . If (d')/(d) = 32 , then find the value of (P')/(P) ?

The pressure P_(1)and density d_(1) of a diatomic gas (gamma=(7)/(5)) change to P_(2) and d_(2) during an adiabatic operation .If (d_(2))/(d_(1))=32, then (P_(2))/(P_(1)) is

An ideal gas with pressure P, volume V and temperature T is expanded isothermally to a volume 2V and a final pressure P_i, If the same gas is expanded adiabatically to a volume 2V, the final pressure P_a. The ratio of the specific heats of the gas is 1.67. The ratio (P_a)/(P_1) is .......

An ideal gas with pressure P, volume V and temperature T is expanded isothermally to a volume 2V and a final pressure P_i, If the same gas is expanded adiabatically to a volume 2V, the final pressure P_a. The ratio of the specific heats of the gas is 1.67. The ratio (P_a)/(P_1) is .......

The change in entropy when the pressure of perfect gas is changed isothermally from P_1 to P_2 is

If "^(2n+1)P_(n-1):^(2n-1)P_n=3:5, then find the value of n .

There are two sets M_1 and M_2 each of which consists of three numbers in arithmetic sequence whose sum is 15. Let d_1 and d_2 be the common differences such that d_1=1+d_2 and 8p_1=7p_2 where p_1 and p_2 are the product of the numbers respectively in M_1 and M_2 . If d_2 gt 0 then find the value of (p_2-p_1)/(d_1+d_2)

If p + 1/( p + 2 ) = 3 , find the value of ( p + 2 )^3 + 1/( p + 2 )^3

Find the distance between the points P\ a n d\ Q having coordinates (-2,3,1) and (2,1,2).