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1) Convert the diameter from inches to centimeters:
Diameter: 2.0 inches (±0.8 inches) to cm.

2) Convert the mass flow rate to volumetric flow rate in L/min, using the diameter from part (1):
Given mass flow rate: 13 (±0.8) kg/min.

3) Find the Reynolds Number.

Answer :

Final answer:

The diameter of 2.0 inches converts to approximately 5.08 cm. Without the density, the volumetric flow rate cannot be precisely calculated. Using the Reynolds number formula, you can determine if the flow is laminal, transitional, or turbulent.

Explanation:

The first step is to convert 2.0 inches to cm. As 1 inch equals 2.54 cm, the diameter 2.0 inches is approximately 5.08 cm (±2.03 cm).

Secondly, to convert a mass flow rate to a volumetric flow rate, you need to know the fluid density. However, without the density given, the volumetric flow rate cannot be calculated precisely.

Last, to calculate the Reynold's number, we use the formula NR = Avρ/η, where A is the cross-sectional area of the pipe (πr²), v is the average velocity, ρ is the fluid density, and η is the fluid viscosity. If less than 2000, the flow is laminar, if the number is between 2000 and 3000, it is transitional, and if greater than 3000, the flow is turbulent.

Learn more about Unit Conversion and Reynold's Number here:

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