What is the relation between mach number and pressure ratio?(a) \(\frac{p1}{p2}=\Big\{1+\frac{\gamma-1}{2}(M)^2\Big\}^\frac{\gamma}{\gamma-1}\)(b) \(\frac{p2}{p1}=\Big\{1+\frac{\gamma-1}{2}(M)^2\Big\}^\frac{\gamma}{\gamma-1}\)(c) \(\frac{p1}{p2}=\Big\{1+\frac{\gamma+1}{2}(M)^2\Big\}^\frac{\gamma}{\gamma-1}\)(d) \(\frac{p1}{p2}=\Big\{1-\frac{\gamma+1}{2}(M)^2\Big\}^\frac{\gamma}{\gamma-1}\)I got this question during an interview for a job.Question is taken from Measurement of Mach Number topic in section Atmosphere and Air Data Measurement of Aircraft Performance

What is the relation between mach number and pressure ratio?(a) \(\fra

1.	What is the relation between mach number and pressure ratio?(a) \(\frac{p1}{p2}=\Big\{1+\frac{\gamma-1}{2}(M)^2\Big\}^\frac{\gamma}{\gamma-1}\)(b) \(\frac{p2}{p1}=\Big\{1+\frac{\gamma-1}{2}(M)^2\Big\}^\frac{\gamma}{\gamma-1}\)(c) \(\frac{p1}{p2}=\Big\{1+\frac{\gamma+1}{2}(M)^2\Big\}^\frac{\gamma}{\gamma-1}\)(d) \(\frac{p1}{p2}=\Big\{1-\frac{\gamma+1}{2}(M)^2\Big\}^\frac{\gamma}{\gamma-1}\)I got this question during an interview for a job.Question is taken from Measurement of Mach Number topic in section Atmosphere and Air Data Measurement of Aircraft Performance
Answer» Right choice is (a) \(\frac{p1}{p2}=\Big\{1+\frac{\gamma-1}{2}(M)^2\Big\}^\frac{\gamma}{\gamma-1}\) Easy explanation: The relation between mach number and pressure is \(\frac{p1}{p2}=\Big\{1+\frac{\gamma-1}{2}(M)^2\Big\}^\frac{\gamma}{\gamma-1}\) where p1, p2 are pressures at two points, M=mach number and γ is the RATIO of specific HEAT at constant pressure to that of specific heat at constant volume.

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