If the velocity potential is given by ϕ = +2x^2 – 4xy^2 + \( \frac {8x^2}{y}\), then what is the value of velocity component in x – direction at point (2,1)?(a) 30 m/s(b) 15 m/s(c) 36 m/s(d) 24 m/sThe question was asked by my school teacher while I was bunking the class.This key question is from The Velocity Potential Equation in chapter Velocity Potential Equation of Aerodynamics

If the velocity potential is given by ϕ = +2x^2 – 4xy^2 + \( \frac

1.	If the velocity potential is given by ϕ = +2x^2 – 4xy^2 + \( \frac {8x^2}{y}\), then what is the value of velocity component in x – direction at point (2,1)?(a) 30 m/s(b) 15 m/s(c) 36 m/s(d) 24 m/sThe question was asked by my school teacher while I was bunking the class.This key question is from The Velocity Potential Equation in chapter Velocity Potential Equation of Aerodynamics
Answer» The correct answer is (c) 36 m/s The BEST EXPLANATION: The velocity potential is given as ϕ = 2x^2 – 4xy^2 + \( \frac {8x^2}{y}\) Velocity component in x – direction is given by u = –\( \frac {∂ϕ}{∂x}\) u = –\( \frac {∂}{∂x} \big ( \)2x^2 – 4xy^2 + \( \frac {8x^2}{y} \big ) \) = 4x – 4y^2 + \( \frac {16x}{y}\) For calculating the velocity component at point (2,1), we substitute these POINTS in the above equation u = 4(2) – 4(1)^2 + \( \frac {16(2)}{(1)}\) = 8 – 4 + 32 = 36 m/s

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