Question: SOLVE WITH PYTHON SOLVE WITH PYTHON SOLVE WITH PYTHON SOLVE WITH PYTHON SOLVE WITH PYTHON SOLVE WITH PYTHON SOLVE WITH PYTHON SOLVE WITH PYTHON The
SOLVE WITH PYTHON
SOLVE WITH PYTHON SOLVE WITH PYTHON SOLVE WITH PYTHON SOLVE WITH PYTHON SOLVE WITH PYTHON SOLVE WITH PYTHON SOLVE WITH PYTHON
The distribution of the x-component of the velocity (u) of a fluid near a flat surface is measured as a function of the distance y from the surface: y (m) u (m/s) 0 0 0.001 0.002 0.002 0.005 0.003 0.008 0.004 0.012 0.005 0.017 The shear stress, Tyz in the fluid is described by Newton's equation: au Tyz =- where u is the coefficient of dynamic viscosity. The viscosity can be thought of as a measure of the internal friction within the fluid. Fluids that obey Newton's constitutive equation are called Newtonian fluids. Calculate the shear stress (in) at y=0 using (1) the first forward, and (ii) the second forward approximations for the derivative. Adjust the formatting to print values to at least 3 significant figures! Assume j = 0.00516 m Hints: = Since you are only solving for the derivative at y = 0, you do not need to find the derivative at all points
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