Solution suppose that a blood vessel of cross-sectional area a carries microbubbles at a speed v into a capillary bed. if the capillary bed is made up of n capillaries, each with cross-sectional area a, with what speed will the blood flow in the capillary bed

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lilaipo lilaipo · Answer 1 · 2018-08-03T11:11:39+02:00

let u=speed of flow

A x v = n x a x u then u = A x v/ n x a

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podgorica podgorica · Answer 2 · 2019-09-06T13:01:30+02:00

Answer:

The speed of blood flow in the capillary bed is [tex]\frac{1}{n}[/tex] times the speed of blood flow in the blood vessel

Explanation:

Let the cross-sectional area of blood vessel be "A"

The speed of flow of blood into the capillaries is "v"

Now , it is given that capillary bed is made up of w "n" numbers of blood vessels with cross section area "A" and and speed "V"

Now as per continuity equation of flow, the flow remains constant when the density is unchanged

Thus ,

Flow in single blood vessel is equal to flow in "n" capillaries of capillary bed

Therefore,

[tex]Av= n*A*V\\v= nV\\or \\V= \frac{v}{n}[/tex]

Hence, the speed of blood flow in the capillary bed is [tex]\frac{1}{n}[/tex] times the speed of blood flow in the blood vessel