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Poisson's ratio given Radial stress at center of solid disc Formula

GoPoisson's ratio given Radial stress in solid disc Formula

GoPoisson's ratio given Circumferential stress in solid disc Formula

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Poisson's ratio is a measure of the deformation of a material in directions perpendicular to the direction of loading. It is defined as the negative ratio of transverse strain to axial strain. Check FAQs

𝛎 = (\frac{8 \cdot σ r}{ρ \cdot (ω^{2}) \cdot ({r outer}^{2})}) - 3

𝛎 - Poisson's Ratio?σ_r - Radial Stress?ρ - Density Of Disc?ω - Angular Velocity?r_outer - Outer Radius Disc?

Poisson's ratio given Radial stress at center of solid disc Example

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Here is how the Poisson's ratio given Radial stress at center of solid disc equation looks like with Values.

Here is how the Poisson's ratio given Radial stress at center of solid disc equation looks like with Units.

Here is how the Poisson's ratio given Radial stress at center of solid disc equation looks like.

0.9368 = (\frac{8 \cdot 100}{2 \cdot ({11.2}^{2}) \cdot (900^{2})}) - 3

0.9368 = (\frac{8 \cdot 100N/m²}{2kg/m³ \cdot ({11.2rad/s}^{2}) \cdot ({900mm}^{2})}) - 3

0.9368 = (\frac{8 \cdot 100}{2 \cdot ({11.2}^{2}) \cdot (900^{2})}) - 3

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Poisson's ratio given Radial stress at center of solid disc Solution

Follow our step by step solution on how to calculate Poisson's ratio given Radial stress at center of solid disc?

FIRST Step Consider the formula

𝛎 = (\frac{8 \cdot σ r}{ρ \cdot (ω^{2}) \cdot ({r outer}^{2})}) - 3

Next Step Substitute values of Variables

∴

𝛎 = (\frac{8 \cdot 100N/m²}{2kg/m³ \cdot ({11.2rad/s}^{2}) \cdot ({900mm}^{2})}) - 3

Next Step Convert Units

∴

𝛎 = (\frac{8 \cdot 100Pa}{2kg/m³ \cdot ({11.2rad/s}^{2}) \cdot ({0.9m}^{2})}) - 3

Next Step Prepare to Evaluate

∴

𝛎 = (\frac{8 \cdot 100}{2 \cdot ({11.2}^{2}) \cdot ({0.9}^{2})}) - 3

Next Step Evaluate

∴

𝛎 = 0.936759889140842

LAST Step Rounding Answer

∴

𝛎 = 0.9368

Poisson's ratio given Radial stress at center of solid disc Formula Elements

Variables

Poisson's Ratio

Poisson's ratio is a measure of the deformation of a material in directions perpendicular to the direction of loading. It is defined as the negative ratio of transverse strain to axial strain.

Symbol: 𝛎

Measurement: NAUnit: Unitless

Note: Value should be between -1 to 10.

Formulas to find Poisson's Ratio

Radial Stress

Radial stress refers to the stress that acts perpendicular to the longitudinal axis of a component, directed either towards or away from the central axis.

Symbol: σ_r

Measurement: PressureUnit: N/m²

Note: Value should be greater than 0.

Formulas to find Radial Stress

Density Of Disc

Density of disc typically refers to the mass per unit volume of the disc material. It is a measure of how much mass is contained in a given volume of the disc.

Symbol: ρ

Measurement: DensityUnit: kg/m³

Note: Value should be greater than 0.

Formulas to find Density Of Disc

Angular Velocity

Angular velocity is a measure of how quickly an object rotates or revolves around a central point or axis, describes the rate of change of the angular position of the object with respect to time.

Symbol: ω

Measurement: Angular VelocityUnit: rad/s

Note: Value should be greater than 0.

Formulas to find Angular Velocity

Outer Radius Disc

Outer radius disc is the distance from the center of the disc to its outer edge or boundary.

Symbol: r_outer

Measurement: LengthUnit: mm

Note: Value can be positive or negative.

Formulas to find Outer Radius Disc

Other Formulas to find Poisson's Ratio

Go Poisson's ratio given Radial stress in solid disc

𝛎 = (\frac{((\frac{C}{2}) - σ r) \cdot 8}{ρ \cdot (ω^{2}) \cdot ({r disc}^{2})}) - 3

Go Poisson's ratio given Circumferential stress in solid disc

𝛎 = \frac{(\frac{((\frac{C 1}{2}) - σ c) \cdot 8}{ρ \cdot (ω^{2}) \cdot ({r disc}^{2})}) - 1}{3}

Go Poisson's ratio given constant at boundary condition for circular disc

𝛎 = (\frac{8 \cdot C 1}{ρ \cdot (ω^{2}) \cdot ({r outer}^{2})}) - 3

Go Poisson's ratio given Radial stress in solid disc and outer radius

𝛎 = (\frac{8 \cdot σ r}{ρ \cdot (ω^{2}) \cdot (({r outer}^{2}) - (R^{2}))}) - 3

Other formulas in Stresses in Disc category

Go Radial stress in solid disc

σ r = (\frac{C 1}{2}) - (\frac{ρ \cdot (ω^{2}) \cdot ({r disc}^{2}) \cdot (3 + 𝛎)}{8})

Go Constant at boundary condition given Radial stress in solid disc

C 1 = 2 \cdot (σ r + (\frac{ρ \cdot (ω^{2}) \cdot ({r disc}^{2}) \cdot (3 + 𝛎)}{8}))

Go Circumferential stress in solid disc

σ c = (\frac{C 1}{2}) - (\frac{ρ \cdot (ω^{2}) \cdot ({r disc}^{2}) \cdot ((3 \cdot 𝛎) + 1)}{8})

Go Constant at boundary condition given Circumferential stress in solid disc

C 1 = 2 \cdot (σ c + (\frac{ρ \cdot (ω^{2}) \cdot ({r disc}^{2}) \cdot ((3 \cdot 𝛎) + 1)}{8}))

How to Evaluate Poisson's ratio given Radial stress at center of solid disc?

Poisson's ratio given Radial stress at center of solid disc evaluator uses Poisson's Ratio = ((8*Radial Stress)/(Density Of Disc*(Angular Velocity^2)*(Outer Radius Disc^2)))-3 to evaluate the Poisson's Ratio, The Poisson's ratio given Radial stress at center of solid disc formula is defined as a measure of the Poisson effect, the phenomenon in which a material tends to expand in directions perpendicular to the direction of compression. Poisson's Ratio is denoted by 𝛎 symbol.

How to evaluate Poisson's ratio given Radial stress at center of solid disc using this online evaluator? To use this online evaluator for Poisson's ratio given Radial stress at center of solid disc, enter Radial Stress (σ_r), Density Of Disc (ρ), Angular Velocity (ω) & Outer Radius Disc (r_outer) and hit the calculate button.

FAQs on Poisson's ratio given Radial stress at center of solid disc

What is the formula to find Poisson's ratio given Radial stress at center of solid disc?

The formula of Poisson's ratio given Radial stress at center of solid disc is expressed as Poisson's Ratio = ((8*Radial Stress)/(Density Of Disc*(Angular Velocity^2)*(Outer Radius Disc^2)))-3. Here is an example- 0.93676 = ((8*100)/(2*(11.2^2)*(0.9^2)))-3.

How to calculate Poisson's ratio given Radial stress at center of solid disc?

With Radial Stress (σ_r), Density Of Disc (ρ), Angular Velocity (ω) & Outer Radius Disc (r_outer) we can find Poisson's ratio given Radial stress at center of solid disc using the formula - Poisson's Ratio = ((8*Radial Stress)/(Density Of Disc*(Angular Velocity^2)*(Outer Radius Disc^2)))-3.

What are the other ways to Calculate Poisson's Ratio?

Here are the different ways to Calculate Poisson's Ratio-

Poisson's Ratio=((((Constant at Boundary/2)-Radial Stress)*8)/(Density Of Disc*(Angular Velocity^2)*(Disc Radius^2)))-3
Poisson's Ratio=(((((Constant at Boundary Condition/2)-Circumferential Stress)*8)/(Density Of Disc*(Angular Velocity^2)*(Disc Radius^2)))-1)/3
Poisson's Ratio=((8*Constant at Boundary Condition)/(Density Of Disc*(Angular Velocity^2)*(Outer Radius Disc^2)))-3

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Poisson's ratio given Radial stress at center of solid disc Formula

​GoPoisson's ratio given Radial stress in solid disc Formula

​GoPoisson's ratio given Circumferential stress in solid disc Formula

Poisson's ratio given Radial stress at center of solid disc Example

Poisson's ratio given Radial stress at center of solid disc Solution

Poisson's ratio given Radial stress at center of solid disc Formula Elements

Other Formulas to find Poisson's Ratio

Other formulas in Stresses in Disc category

How to Evaluate Poisson's ratio given Radial stress at center of solid disc?

FAQs on Poisson's ratio given Radial stress at center of solid disc

Variable Name

GoPoisson's ratio given Radial stress in solid disc Formula

GoPoisson's ratio given Circumferential stress in solid disc Formula