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Elasticity Modulus given Critical Bending Moment of Rectangular Beam Formula

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The Elastic Modulus is the ratio of Stress to Strain. Check FAQs

e = \frac{{(M Cr(Rect) \cdot Len)}^{2}}{(π^{2}) \cdot I y \cdot G \cdot J}

e - Elastic Modulus?M_Cr(Rect) - Critical Bending Moment for Rectangular?Len - Length of Rectangular Beam?I_y - Moment of Inertia about Minor Axis?G - Shear Modulus of Elasticity?J - Torsional Constant?π - Archimedes' constant?

Elasticity Modulus given Critical Bending Moment of Rectangular Beam Example

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Here is how the Elasticity Modulus given Critical Bending Moment of Rectangular Beam equation looks like with Values.

Here is how the Elasticity Modulus given Critical Bending Moment of Rectangular Beam equation looks like with Units.

Here is how the Elasticity Modulus given Critical Bending Moment of Rectangular Beam equation looks like.

50.0637 = \frac{{(741 \cdot 3)}^{2}}{({3.1416}^{2}) \cdot 10.001 \cdot 100.002 \cdot 10.0001}

50.0637Pa = \frac{{(741N*m \cdot 3m)}^{2}}{({3.1416}^{2}) \cdot 10.001kg·m² \cdot 100.002N/m² \cdot 10.0001}

50.0637 = \frac{{(741 \cdot 3)}^{2}}{({3.1416}^{2}) \cdot 10.001 \cdot 100.002 \cdot 10.0001}

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Elasticity Modulus given Critical Bending Moment of Rectangular Beam Solution

Follow our step by step solution on how to calculate Elasticity Modulus given Critical Bending Moment of Rectangular Beam?

FIRST Step Consider the formula

e = \frac{{(M Cr(Rect) \cdot Len)}^{2}}{(π^{2}) \cdot I y \cdot G \cdot J}

Next Step Substitute values of Variables

∴

e = \frac{{(741N*m \cdot 3m)}^{2}}{(π^{2}) \cdot 10.001kg·m² \cdot 100.002N/m² \cdot 10.0001}

Next Step Substitute values of Constants

∴

e = \frac{{(741N*m \cdot 3m)}^{2}}{({3.1416}^{2}) \cdot 10.001kg·m² \cdot 100.002N/m² \cdot 10.0001}

Next Step Convert Units

∴

e = \frac{{(741N*m \cdot 3m)}^{2}}{({3.1416}^{2}) \cdot 10.001kg·m² \cdot 100.002Pa \cdot 10.0001}

Next Step Prepare to Evaluate

∴

e = \frac{{(741 \cdot 3)}^{2}}{({3.1416}^{2}) \cdot 10.001 \cdot 100.002 \cdot 10.0001}

Next Step Evaluate

∴

e = 50.063674714049Pa

LAST Step Rounding Answer

∴

e = 50.0637Pa

Elasticity Modulus given Critical Bending Moment of Rectangular Beam Formula Elements

Variables

Constants

Elastic Modulus

The Elastic Modulus is the ratio of Stress to Strain.

Symbol: e

Measurement: PressureUnit: Pa

Note: Value should be greater than 0.

Formulas to find Elastic Modulus

Critical Bending Moment for Rectangular

Critical Bending Moment for Rectangular is crucial in the proper design of bent beams susceptible to LTB, as it allows for slenderness calculation.

Symbol: M_Cr(Rect)

Measurement: Moment of ForceUnit: N*m

Note: Value should be greater than 0.

Formulas to find Critical Bending Moment for Rectangular

Length of Rectangular Beam

Length of Rectangular Beam is the measurement or extent of something from end to end.

Symbol: Len

Measurement: LengthUnit: m

Note: Value should be greater than 0.

Formulas to find Length of Rectangular Beam

Moment of Inertia about Minor Axis

Moment of Inertia about Minor Axis is a geometrical property of an area which reflects how its points are distributed with regard to a minor axis.

Symbol: I_y

Measurement: Moment of InertiaUnit: kg·m²

Note: Value should be greater than 0.

Formulas to find Moment of Inertia about Minor Axis

Shear Modulus of Elasticity

Shear Modulus of Elasticity is one of the measures of mechanical properties of solids. Other elastic moduli are Young's modulus and bulk modulus.

Symbol: G

Measurement: PressureUnit: N/m²

Note: Value should be greater than 0.

Formulas to find Shear Modulus of Elasticity

Torsional Constant

The Torsional Constant is a geometrical property of a bar's cross-section which is involved in the relationship between the angle of twist and applied torque along the axis of the bar.

Symbol: J

Measurement: NAUnit: Unitless

Note: Value should be greater than 0.

Formulas to find Torsional Constant

Archimedes' constant

Archimedes' constant is a mathematical constant that represents the ratio of the circumference of a circle to its diameter.

Symbol: π

Value: 3.14159265358979323846264338327950288

Other formulas in Elastic Lateral Buckling of Beams category

Go Critical Bending Moment for Simply Supported Rectangular Beam

M Cr(Rect) = (\frac{π}{Len}) \cdot (\sqrt{e \cdot I y \cdot G \cdot J})

Go Unbraced Member Length given Critical Bending Moment of Rectangular Beam

Len = (\frac{π}{M Cr(Rect)}) \cdot (\sqrt{e \cdot I y \cdot G \cdot J})

Go Minor Axis Moment of Inertia for Critical Bending Moment of Rectangular Beam

I y = \frac{{(M Cr(Rect) \cdot Len)}^{2}}{(π^{2}) \cdot e \cdot G \cdot J}

Go Shear Elasticity Modulus for Critical Bending Moment of Rectangular Beam

G = \frac{{(M Cr(Rect) \cdot Len)}^{2}}{(π^{2}) \cdot I y \cdot e \cdot J}

How to Evaluate Elasticity Modulus given Critical Bending Moment of Rectangular Beam?

Elasticity Modulus given Critical Bending Moment of Rectangular Beam evaluator uses Elastic Modulus = ((Critical Bending Moment for Rectangular*Length of Rectangular Beam)^2)/((pi^2)*Moment of Inertia about Minor Axis*Shear Modulus of Elasticity*Torsional Constant) to evaluate the Elastic Modulus, The Elasticity Modulus given Critical Bending Moment of Rectangular Beam is defined as the measure of material stiffness under stress. Elastic Modulus is denoted by e symbol.

How to evaluate Elasticity Modulus given Critical Bending Moment of Rectangular Beam using this online evaluator? To use this online evaluator for Elasticity Modulus given Critical Bending Moment of Rectangular Beam, enter Critical Bending Moment for Rectangular (M_Cr(Rect)), Length of Rectangular Beam (Len), Moment of Inertia about Minor Axis (I_y), Shear Modulus of Elasticity (G) & Torsional Constant (J) and hit the calculate button.

FAQs on Elasticity Modulus given Critical Bending Moment of Rectangular Beam

What is the formula to find Elasticity Modulus given Critical Bending Moment of Rectangular Beam?

The formula of Elasticity Modulus given Critical Bending Moment of Rectangular Beam is expressed as Elastic Modulus = ((Critical Bending Moment for Rectangular*Length of Rectangular Beam)^2)/((pi^2)*Moment of Inertia about Minor Axis*Shear Modulus of Elasticity*Torsional Constant). Here is an example- 50.06868 = ((741*3)^2)/((pi^2)*10.001*100.002*10.0001).

How to calculate Elasticity Modulus given Critical Bending Moment of Rectangular Beam?

With Critical Bending Moment for Rectangular (M_Cr(Rect)), Length of Rectangular Beam (Len), Moment of Inertia about Minor Axis (I_y), Shear Modulus of Elasticity (G) & Torsional Constant (J) we can find Elasticity Modulus given Critical Bending Moment of Rectangular Beam using the formula - Elastic Modulus = ((Critical Bending Moment for Rectangular*Length of Rectangular Beam)^2)/((pi^2)*Moment of Inertia about Minor Axis*Shear Modulus of Elasticity*Torsional Constant). This formula also uses Archimedes' constant .

Can the Elasticity Modulus given Critical Bending Moment of Rectangular Beam be negative?

No, the Elasticity Modulus given Critical Bending Moment of Rectangular Beam, measured in Pressure cannot be negative.

Which unit is used to measure Elasticity Modulus given Critical Bending Moment of Rectangular Beam?

Elasticity Modulus given Critical Bending Moment of Rectangular Beam is usually measured using the Pascal[Pa] for Pressure. Kilopascal[Pa], Bar[Pa], Pound Per Square Inch[Pa] are the few other units in which Elasticity Modulus given Critical Bending Moment of Rectangular Beam can be measured.

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Elasticity Modulus given Critical Bending Moment of Rectangular Beam Formula

Elasticity Modulus given Critical Bending Moment of Rectangular Beam Example

Elasticity Modulus given Critical Bending Moment of Rectangular Beam Solution

Elasticity Modulus given Critical Bending Moment of Rectangular Beam Formula Elements

Other formulas in Elastic Lateral Buckling of Beams category

How to Evaluate Elasticity Modulus given Critical Bending Moment of Rectangular Beam?

FAQs on Elasticity Modulus given Critical Bending Moment of Rectangular Beam

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