The wind is blowing horizontally at 30 m / s in a storm at P o , 20°C toward a wall, where it comes to a stop (stagnation) and leaves with negligible velocity similar to a diffuser with a very large exit area. Find the stagnation temperature from the energy equation.

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Netta00 Netta00 · Answer 1 · 2020-03-31T07:24:53+02:00

Answer:

To=20.44 °C

Explanation:

Given that

Velocity , v= 30 m/s

Temperature , T= 20°C

We know that specific heat capacity for air ,Cp=1.005 kJ/kg.K

By using energy conservation ,the stagnation temperature is given as

[tex]T_0=T+\dfrac{v^2}{2C_p}[/tex]

Now by putting the values in the above equation we get

[tex]T_0=(20+273)+\dfrac{30^2}{2\times 1.005\times 1000}\ K[/tex]

To= 293.44 K

To= 293.44 - 273 °C

To=20.44 °C

Therefore the stagnation temperature will be 20.44 °C.