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Distance of Element from Center line given Shear Stress at any Cylindrical Element Formula

GoDistance of Element from Center Line given Head Loss Formula

GoDistance of Element from Center Line given Velocity Gradient at Cylindrical Element Formula

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The Radial Distance refers to the distance from a central point, such as the center of a well or pipe, to a point within the fluid system. Check FAQs

d radial = 2 \cdot \frac{𝜏}{dp|dr}

d_radial - Radial Distance?𝜏 - Shear Stress?dp|dr - Pressure Gradient?

Distance of Element from Center line given Shear Stress at any Cylindrical Element Example

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Here is how the Distance of Element from Center line given Shear Stress at any Cylindrical Element equation looks like with Values.

Here is how the Distance of Element from Center line given Shear Stress at any Cylindrical Element equation looks like with Units.

Here is how the Distance of Element from Center line given Shear Stress at any Cylindrical Element equation looks like.

10.9529 = 2 \cdot \frac{93.1}{17}

10.9529m = 2 \cdot \frac{93.1Pa}{17N/m³}

10.9529 = 2 \cdot \frac{93.1}{17}

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Distance of Element from Center line given Shear Stress at any Cylindrical Element Solution

Follow our step by step solution on how to calculate Distance of Element from Center line given Shear Stress at any Cylindrical Element?

FIRST Step Consider the formula

d radial = 2 \cdot \frac{𝜏}{dp|dr}

Next Step Substitute values of Variables

∴

d radial = 2 \cdot \frac{93.1Pa}{17N/m³}

Next Step Prepare to Evaluate

∴

d radial = 2 \cdot \frac{93.1}{17}

Next Step Evaluate

∴

d radial = 10.9529411764706m

LAST Step Rounding Answer

∴

d radial = 10.9529m

Distance of Element from Center line given Shear Stress at any Cylindrical Element Formula Elements

Variables

Radial Distance

The Radial Distance refers to the distance from a central point, such as the center of a well or pipe, to a point within the fluid system.

Symbol: d_radial

Measurement: LengthUnit: m

Note: Value can be positive or negative.

Formulas to find Radial Distance

Shear Stress

The Shear Stress refers to the force tending to cause deformation of a material by slippage along a plane or planes parallel to the imposed stress.

Symbol: 𝜏

Measurement: StressUnit: Pa

Note: Value should be greater than 0.

Formulas to find Shear Stress

Pressure Gradient

The Pressure Gradient refers to the rate of change of pressure in a particular direction indicating how quickly the pressure increases or decreases around a specific location.

Symbol: dp|dr

Measurement: Pressure GradientUnit: N/m³

Note: Value should be greater than 0.

Formulas to find Pressure Gradient

Other Formulas to find Radial Distance

Go Distance of Element from Center Line given Head Loss

d radial = 2 \cdot 𝜏 \cdot \frac{L p}{h \cdot γ f}

Go Distance of Element from Center Line given Velocity Gradient at Cylindrical Element

d radial = 2 \cdot μ \cdot \frac{V G}{dp|dr}

Go Distance of Element from Center Line given Velocity at any point in Cylindrical Element

d radial = \sqrt{(R^{2}) - (- 4 \cdot μ \cdot \frac{v Fluid}{dp|dr})}

Other formulas in Steady Laminar Flow in Circular Pipes category

Go Shear Stress at any Cylindrical Element

𝜏 = dp|dr \cdot \frac{d radial}{2}

Go Shear Stress at any Cylindrical Element given Head Loss

𝜏 = \frac{γ f \cdot h \cdot d radial}{2 \cdot L p}

Go Velocity Gradient given Pressure Gradient at Cylindrical Element

V G = (\frac{1}{2 \cdot μ}) \cdot dp|dr \cdot d radial

Go Velocity at any point in Cylindrical Element

v Fluid = - (\frac{1}{4 \cdot μ}) \cdot dp|dr \cdot ((R^{2}) - ({d radial}^{2}))

How to Evaluate Distance of Element from Center line given Shear Stress at any Cylindrical Element?

Distance of Element from Center line given Shear Stress at any Cylindrical Element evaluator uses Radial Distance = 2*Shear Stress/Pressure Gradient to evaluate the Radial Distance, The Distance of Element from Center line given Shear Stress at any Cylindrical Element is defined as radius of elemental section. Radial Distance is denoted by d_radial symbol.

How to evaluate Distance of Element from Center line given Shear Stress at any Cylindrical Element using this online evaluator? To use this online evaluator for Distance of Element from Center line given Shear Stress at any Cylindrical Element, enter Shear Stress (𝜏) & Pressure Gradient (dp|dr) and hit the calculate button.

FAQs on Distance of Element from Center line given Shear Stress at any Cylindrical Element

What is the formula to find Distance of Element from Center line given Shear Stress at any Cylindrical Element?

The formula of Distance of Element from Center line given Shear Stress at any Cylindrical Element is expressed as Radial Distance = 2*Shear Stress/Pressure Gradient. Here is an example- 10.95294 = 2*93.1/17.

How to calculate Distance of Element from Center line given Shear Stress at any Cylindrical Element?

With Shear Stress (𝜏) & Pressure Gradient (dp|dr) we can find Distance of Element from Center line given Shear Stress at any Cylindrical Element using the formula - Radial Distance = 2*Shear Stress/Pressure Gradient.

What are the other ways to Calculate Radial Distance?

Here are the different ways to Calculate Radial Distance-

Radial Distance=2*Shear Stress*Length of Pipe/(Head Loss due to Friction*Specific Weight of Liquid)
Radial Distance=2*Dynamic Viscosity*Velocity Gradient/Pressure Gradient
Radial Distance=sqrt((Radius of pipe^2)-(-4*Dynamic Viscosity*Fluid Velocity/Pressure Gradient))

Can the Distance of Element from Center line given Shear Stress at any Cylindrical Element be negative?

Yes, the Distance of Element from Center line given Shear Stress at any Cylindrical Element, measured in Length can be negative.

Which unit is used to measure Distance of Element from Center line given Shear Stress at any Cylindrical Element?

Distance of Element from Center line given Shear Stress at any Cylindrical Element is usually measured using the Meter[m] for Length. Millimeter[m], Kilometer[m], Decimeter[m] are the few other units in which Distance of Element from Center line given Shear Stress at any Cylindrical Element can be measured.

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