Answer: Blood Flow The velocity of the flow of blood at a distance from the central axis
Chapter 5, Problem 66(choose chapter or problem)
The velocity \(v\) of the flow of blood at a distance \(r\) from the central axis of an artery of radius \(R\) is
\(v=k\left(R^{2}-r^{2}\right)\)
where \(k\) is the constant of proportionality. Find the average rate of flow of blood along a radius of the artery. (Use 0 and \(R\) as the limits of integration.)
Text Transcription:
v
r
R
v=k(R^2-r^2)
k
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