- #1
falcon0311
- 29
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So I've got this velocity distribution for laminar flow between parallel plates.
\frac{u}{u_{max}} = 1 - (\frac{2y}{h})^2
h is the distance between the plates with the origin placed midway between the plates. I'm assuming this is for water flowing at 15 deg C with u_{max} = 0.10 m/s and h = 0.25 mm.
I'm supposed to calculate the shear stress on the upper plate and give its direction. I'm trying to figure out how to incorporate these into
\tau_{yx} = \mu \frac{du}{dy} at 15 deg C, \mu = 1.14*10^{-3} N*s/m^2 I also know the temperature has to be in Kelvin (288.15K in this case). Anyone willing to give me a push?
\frac{u}{u_{max}} = 1 - (\frac{2y}{h})^2
h is the distance between the plates with the origin placed midway between the plates. I'm assuming this is for water flowing at 15 deg C with u_{max} = 0.10 m/s and h = 0.25 mm.
I'm supposed to calculate the shear stress on the upper plate and give its direction. I'm trying to figure out how to incorporate these into
\tau_{yx} = \mu \frac{du}{dy} at 15 deg C, \mu = 1.14*10^{-3} N*s/m^2 I also know the temperature has to be in Kelvin (288.15K in this case). Anyone willing to give me a push?
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