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

The pressure and density of a monoatomic gas (gamma = 5//3) change adiabitically from (P_(1), d_(1)) to (P_(2), d_(2)). If (d_(2))/(d_(1))=8 then (P_(2))/(P_(1)) should be

The pressure and density of a diatomic gas (gamma=7//5) change adiabatically from (p,d) to (p^(1),d^(2)) . If (d^(1))/(d)=32 , then (P^(1))/(P) should be

The pressure and density of a monoatmic gas (gamma=5//3) change adiabatically from , (P_(1),d_(1)) to (P_(2),d_(2)) .If (d_(2))/(d_(1))=8 then (P_(2))/(P_(1)) 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 (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 and density of a given mass of a diatomic gas (gamma = (7)/(5)) change adiabatically from (p,d) to (p',d') . If (d')/(d) =32 , then (p')/(p) is ( gamma = ration of specific heat).