Answer:
velocity of stream = [tex]v_{1}[/tex] = 461m/s
Explanation:
see stagnation temperature = 95 C = 95 + 273 = 368 K
now stagnation pressure = P1 = 180 pa
and P2 55 Kpa
now for air specific heta ratio = y = 1.4
for supersonic flow : T2/T1 = (P2/P1)[tex](y-1)/y{}[/tex]
so, T2/368 = (55/180)[tex]{(1.4-1)/1.4}[/tex]
so T2 = 262.26 K = static Temperature
now, if we apply energy balance equation b/w static and stagnation point :
we get :
Cp.T1 + v1^2/2 = Cp.T2 + V2^2/2
here Cp = 1.005 KJ/Kg.K
and V2 = 0 as at static point velocity = 0
so, 1.005 x 368 + V1^2/2 x 1000 = 1.005 x 262.6
so,velocity of stream = V1 = 461m/s
