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Kerosene flows through 3/4 standard type K drawn copper tube. The pressure drop measured at two points 50 m apart is 130 kPa. Determine the flow rate of the kerosene

Respuesta :

Answer:

[tex]Q=4.98\times 10^{-3}\ m^3/s[/tex].

Explanation:

Given that

L= 50 m

Pressure drop = 130 KPa

copper tube is 3/4 standard type K drawn tube.

From standard chart ,the dimension of 3/4 standard type K copper tube given as

Outside diameter=22.22 mm

Inside diameter=18.92 mm

Dynamic viscosity for kerosene

[tex]\mu =0.00164\ Pa.s[/tex]

We know that

[tex]\Delta P=\dfrac{128\mu QL}{\pi d_i^4}[/tex]

Where Q is volume flow rate

L is length of tube

[tex]d_i[/tex] is inner diameter of tube

ΔP is pressure drop

μ is dynamic viscosity

Now by putting the values

[tex]\Delta P=\dfrac{128\mu QL}{\pi d_i^4}[/tex]

[tex]130\times 1000=\dfrac{128\times 0.00164\times 50Q}{\pi \times 0.01892^4}[/tex]

[tex]Q=4.98\times 10^{-3}\ m^3/s[/tex]

So flow rate is [tex]Q=4.98\times 10^{-3}\ m^3/s[/tex].

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