Density of material given Radial stress in solid disc Calculator

✖Constant at boundary condition is value obtained for stress in solid disc.ⓘ Constant at boundary condition [C₁]			+10% -10%
✖Radial Stress induced by a bending moment in a member of constant cross section.ⓘ Radial Stress [σ_r]			+10% -10%
✖The Angular Velocity refers to how fast an object rotates or revolves relative to another point, i.e. how fast the angular position or orientation of an object changes with time.ⓘ Angular Velocity [ω]			+10% -10%
✖Disc Radius is a radial line from the focus to any point of a curve.ⓘ Disc Radius [r_disc]			+10% -10%
✖Poisson's Ratio is defined as the ratio of the lateral and axial strain. For many metals and alloys, values of Poisson’s ratio range between 0.1 and 0.5.ⓘ Poisson's Ratio [𝛎]			+10% -10%

✖Density Of Disc shows the denseness of disc in a specific given area. This is taken as mass per unit volume of a given disc.ⓘ Density of material given Radial stress in solid disc [ρ]

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Density of material given Radial stress in solid disc Solution

STEP 0: Pre-Calculation Summary

Formula Used

Density Of Disc = (((Constant at boundary condition/2)-Radial Stress)*8)/((Angular Velocity^2)*(Disc Radius^2)*(3+Poisson's Ratio))
ρ = (((C₁/2)-σ_r)*8)/((ω^2)*(r_disc^2)*(3+𝛎))
This formula uses 6 Variables

Variables Used

Density Of Disc - (Measured in Kilogram per Cubic Meter) - Density Of Disc shows the denseness of disc in a specific given area. This is taken as mass per unit volume of a given disc.
Constant at boundary condition - Constant at boundary condition is value obtained for stress in solid disc.
Radial Stress - (Measured in Pascal) - Radial Stress induced by a bending moment in a member of constant cross section.
Angular Velocity - (Measured in Radian per Second) - The Angular Velocity refers to how fast an object rotates or revolves relative to another point, i.e. how fast the angular position or orientation of an object changes with time.
Disc Radius - (Measured in Meter) - Disc Radius is a radial line from the focus to any point of a curve.
Poisson's Ratio - Poisson's Ratio is defined as the ratio of the lateral and axial strain. For many metals and alloys, values of Poisson’s ratio range between 0.1 and 0.5.

STEP 1: Convert Input(s) to Base Unit

Constant at boundary condition: 300 --> No Conversion Required
Radial Stress: 100 Newton per Square Meter --> 100 Pascal (Check conversion here)
Angular Velocity: 11.2 Radian per Second --> 11.2 Radian per Second No Conversion Required
Disc Radius: 1000 Millimeter --> 1 Meter (Check conversion here)
Poisson's Ratio: 0.3 --> No Conversion Required

STEP 2: Evaluate Formula

Substituting Input Values in Formula

ρ = (((C₁/2)-σ_r)*8)/((ω^2)*(r_disc^2)*(3+𝛎)) --> (((300/2)-100)*8)/((11.2^2)*(1^2)*(3+0.3))

Evaluating ... ...

ρ = 0.966295609152752

STEP 3: Convert Result to Output's Unit

0.966295609152752 Kilogram per Cubic Meter --> No Conversion Required

FINAL ANSWER

0.966295609152752 ≈ 0.966296 Kilogram per Cubic Meter <-- Density Of Disc

(Calculation completed in 00.004 seconds)

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< Density of Disc Calculators

Density of material given Circumferential stress in solid disc

LaTeX Go Density Of Disc = (((Constant at boundary condition/2)-Circumferential Stress)*8)/((Angular Velocity^2)*(Disc Radius^2)*((3*Poisson's Ratio)+1))

Density of disc material given Radial stress in solid disc and outer radius

LaTeX Go Density Of Disc = ((8*Radial Stress)/((Angular Velocity^2)*(3+Poisson's Ratio)*((Outer Radius Disc^2)-(Radius of Element^2))))

Density of material given constant at boundary condition for circular disc

LaTeX Go Density Of Disc = (8*Constant at boundary condition)/((Angular Velocity^2)*(Outer Radius Disc^2)*(3+Poisson's Ratio))

Density of material given Circumferential stress at center of solid disc

LaTeX Go Density Of Disc = ((8*Circumferential Stress)/((Angular Velocity^2)*(3+Poisson's Ratio)*(Outer Radius Disc^2)))

Density of material given Radial stress in solid disc Formula

LaTeX Go

Density Of Disc = (((Constant at boundary condition/2)-Radial Stress)*8)/((Angular Velocity^2)*(Disc Radius^2)*(3+Poisson's Ratio))
ρ = (((C₁/2)-σ_r)*8)/((ω^2)*(r_disc^2)*(3+𝛎))

What is radial and tangential stress?

The “Hoop Stress” or “Tangential Stress” acts on a line perpendicular to the “longitudinal “and the “radial stress;” this stress attempts to separate the pipe wall in the circumferential direction. This stress is caused by internal pressure.

How to Calculate Density of material given Radial stress in solid disc?

Density of material given Radial stress in solid disc calculator uses Density Of Disc = (((Constant at boundary condition/2)-Radial Stress)*8)/((Angular Velocity^2)*(Disc Radius^2)*(3+Poisson's Ratio)) to calculate the Density Of Disc, The Density of material given Radial stress in solid disc formula is defined as a measure of mass per volume. An object made from a comparatively dense material (such as iron) will have less volume than an object of equal mass made from some less dense substance (such as water). Density Of Disc is denoted by ρ symbol.

How to calculate Density of material given Radial stress in solid disc using this online calculator? To use this online calculator for Density of material given Radial stress in solid disc, enter Constant at boundary condition (C₁), Radial Stress (σ_r), Angular Velocity (ω), Disc Radius (r_disc) & Poisson's Ratio (𝛎) and hit the calculate button. Here is how the Density of material given Radial stress in solid disc calculation can be explained with given input values -> 0.966296 = (((300/2)-100)*8)/((11.2^2)*(1^2)*(3+0.3)).

FAQ

What is Density of material given Radial stress in solid disc?

The Density of material given Radial stress in solid disc formula is defined as a measure of mass per volume. An object made from a comparatively dense material (such as iron) will have less volume than an object of equal mass made from some less dense substance (such as water) and is represented as ρ = (((C₁/2)-σ_r)*8)/((ω^2)*(r_disc^2)*(3+𝛎)) or Density Of Disc = (((Constant at boundary condition/2)-Radial Stress)*8)/((Angular Velocity^2)*(Disc Radius^2)*(3+Poisson's Ratio)). Constant at boundary condition is value obtained for stress in solid disc, Radial Stress induced by a bending moment in a member of constant cross section, The Angular Velocity refers to how fast an object rotates or revolves relative to another point, i.e. how fast the angular position or orientation of an object changes with time, Disc Radius is a radial line from the focus to any point of a curve & Poisson's Ratio is defined as the ratio of the lateral and axial strain. For many metals and alloys, values of Poisson’s ratio range between 0.1 and 0.5.

How to calculate Density of material given Radial stress in solid disc?

The Density of material given Radial stress in solid disc formula is defined as a measure of mass per volume. An object made from a comparatively dense material (such as iron) will have less volume than an object of equal mass made from some less dense substance (such as water) is calculated using Density Of Disc = (((Constant at boundary condition/2)-Radial Stress)*8)/((Angular Velocity^2)*(Disc Radius^2)*(3+Poisson's Ratio)). To calculate Density of material given Radial stress in solid disc, you need Constant at boundary condition (C₁), Radial Stress (σ_r), Angular Velocity (ω), Disc Radius (r_disc) & Poisson's Ratio (𝛎). With our tool, you need to enter the respective value for Constant at boundary condition, Radial Stress, Angular Velocity, Disc Radius & Poisson's Ratio and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.

How many ways are there to calculate Density Of Disc?

In this formula, Density Of Disc uses Constant at boundary condition, Radial Stress, Angular Velocity, Disc Radius & Poisson's Ratio. We can use 3 other way(s) to calculate the same, which is/are as follows -

Density Of Disc = ((8*Radial Stress)/((Angular Velocity^2)*(3+Poisson's Ratio)*((Outer Radius Disc^2)-(Radius of Element^2))))
Density Of Disc = ((8*Circumferential Stress)/((Angular Velocity^2)*(3+Poisson's Ratio)*(Outer Radius Disc^2)))
Density Of Disc = (8*Constant at boundary condition)/((Angular Velocity^2)*(Outer Radius Disc^2)*(3+Poisson's Ratio))

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