Second polar moment of area

Template:Short description Template:Distinguish

Template:Multiple issues The second polar moment of area, also known (incorrectly, colloquially) as "polar moment of inertia" or even "moment of inertia", is a quantity used to describe resistance to torsional deformation (deflection), in objects (or segments of an object) with an invariant cross-section and no significant warping or out-of-plane deformation.^[1] It is a constituent of the second moment of area, linked through the perpendicular axis theorem. Where the planar second moment of area describes an object's resistance to deflection (bending) when subjected to a force applied to a plane parallel to the central axis, the polar second moment of area describes an object's resistance to deflection when subjected to a moment applied in a plane perpendicular to the object's central axis (i.e. parallel to the cross-section). Similar to planar second moment of area calculations (${\displaystyle I_x}$,${\displaystyle I_y}$, and ${\displaystyle I_{xy}}$), the polar second moment of area is often denoted as ${\displaystyle I_z}$. While several engineering textbooks and academic publications also denote it as ${\displaystyle J}$ or ${\displaystyle J_z}$, this designation should be given careful attention so that it does not become confused with the torsion constant, ${\displaystyle J_t}$, used for non-cylindrical objects.

Simply put, the polar moment of area is a shaft or beam's resistance to being distorted by torsion, as a function of its shape. The rigidity comes from the object's cross-sectional area only, and does not depend on its material composition or shear modulus. The greater the magnitude of the second polar moment of area, the greater the torsional stiffness of the object.

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The equation describing the polar moment of area is a multiple integral over the cross-sectional area, ${\displaystyle A}$, of the object.

$${\displaystyle J=\underset{A}{\iint }{r}^{2}dA}$$ where ${\displaystyle r}$ is the distance to the element ${\displaystyle dA}$.

Substituting the ${\displaystyle x}$ and ${\displaystyle y}$ components, using the Pythagorean theorem: $${\displaystyle J=\underset{A}{\iint }(x^2+y^2)dxdy}$$ $${\displaystyle J=\underset{A}{\iint }{x}^{2}dxdy+\underset{A}{\iint }{y}^{2}dxdy}$$

Given the planar second moments of area equations, where: $${\displaystyle I_x=\underset{A}{\iint }{y}^{2}dxdy}$$ $${\displaystyle I_y=\underset{A}{\iint }{x}^{2}dxdy}$$

It is shown that the polar moment of area can be described as the summation of the ${\displaystyle x}$ and ${\displaystyle y}$ planar moments of area, ${\displaystyle I_x}$ and ${\displaystyle I_y}$ $${\displaystyle \therefore J=I_z=I_x+I_y}$$

This is also shown in the perpendicular axis theorem.^[2] For objects that have rotational symmetry,^[3] such as a cylinder or hollow tube, the equation can be simplified to: $${\displaystyle J=2I_x}$$ or $${\displaystyle J=2I_y}$$

For a circular section with radius ${\displaystyle R}$: $${\displaystyle I_z={\displaystyle \underset{0}{\overset{2\pi }{\int }}}{\displaystyle \underset{0}{\overset{R}{\int }}}{r}^2(rdrd\varphi )=\frac{\pi R^4}{2}}$$

The SI unit for polar second moment of area, like the planar second moment of area, is meters to the fourth power (m⁴), and inches to the fourth power (in⁴) in U.S. Customary units and imperial units.

The polar second moment of area can be insufficient for use to analyze beams and shafts with non-circular cross-sections, due their tendency to warp when twisted, causing out-of-plane deformations. In such cases, a torsion constant should be substituted, where an appropriate deformation constant is included to compensate for the warping effect. Within this, there are articles that differentiate between the polar second moment of area, ${\displaystyle I_z}$, and the torsional constant, ${\displaystyle J_t}$, no longer using ${\displaystyle J}$ to describe the polar second moment of area.^[4]

In objects with significant cross-sectional variation (along the axis of the applied torque), which cannot be analyzed in segments, a more complex approach may have to be used. See 3-D elasticity.

Though the polar second moment of area is most often used to calculate the angular displacement of an object subjected to a moment (torque) applied parallel to the cross-section, the provided value of rigidity does not have any bearing on the torsional resistance provided to an object as a function of its constituent materials. The rigidity provided by an object's material is a characteristic of its shear modulus, ${\displaystyle G}$. Combining these two features with the length of the shaft, ${\displaystyle L}$, one is able to calculate a shaft's angular deflection, ${\displaystyle \theta }$, due to the applied torque, ${\displaystyle T}$: $${\displaystyle \theta =\frac{TL}{JG}}$$

As shown, the larger the material's shear modulus and polar second moment of area (i.e. larger cross-sectional area), the greater resistance to torsional deflection.

The polar second moment of area appears in the formulae that describe torsional stress and angular displacement.

Torsional stresses: $${\displaystyle \tau =\frac{Tr}{J_z}}$$ where ${\displaystyle \tau }$ is the torsional shear stress, ${\displaystyle T}$ is the applied torque, ${\displaystyle r}$ is the distance from the central axis, and ${\displaystyle J_z}$ is the polar second moment of area.

Note: In a circular shaft, the shear stress is maximal at the surface of the shaft.

Calculation of the steam turbine shaft radius for a turboset:

Assumptions:

• Power carried by the shaft is 1000Template:NbspMW; this is typical for a large nuclear power plant.
• Yield stress of the steel used to make the shaft (τ_yield) is: 250Template:Nbsp×Template:Nbsp10⁶Template:NbspN/m².
• Electricity has a frequency of 50Template:NbspHz; this is the typical frequency in Europe. In North America the frequency is 60Template:NbspHz. This is assuming that there is a 1:1 correlation between rotational velocity of turbine and the frequency of mains power.

The angular frequency can be calculated with the following formula: $${\displaystyle \omega =2\pi f}$$

The torque carried by the shaft is related to the power by the following equation: $${\displaystyle P=T\omega }$$

The angular frequency is therefore 314.16Template:Nbsprad/s and the torque 3.1831Template:Nbsp×Template:Nbsp10⁶Template:NbspN·m.

The maximal torque is: $${\displaystyle T_{\max }=\frac{{\tau }_{\max }{J}_z}{r}}$$

After substitution of the polar second moment of area the following expression is obtained: $${\displaystyle r=\sqrt[3]{\frac{2T_{\max }}{\pi {\tau }_{\max }}}}$$

The radius is r=0.200Template:Nbspm = 200Template:Nbspmm, or a diameter of 400Template:Nbspmm. If one adds a factor of safety of 5 and re-calculates the radius with the admissible stress equal to the τ_adm=τ_yield/5 the result is a radius of 0.343Template:Nbspm, or a diameter of 690Template:Nbspmm, the approximate size of a turboset shaft in a nuclear power plant.

Polar second moment of area: $${\displaystyle I_z=\frac{\pi (D^4-d^4)}{32}}$$

Moment of inertia: $${\displaystyle I_c=I_z\rho l=\frac{\pi \rho l(D^4-d^4)}{32}}$$

Polar second moment of area $${\displaystyle I_z=\frac{\pi D^4}{32}}$$

Moment of inertia $${\displaystyle I_c=I_z\rho l=\frac{\pi \rho l{D}^4}{32}}$$ where:

• ${\displaystyle d}$ is the inner diameter in meters (m)
• ${\displaystyle D}$ is the outer diameter in meters (m)
• ${\displaystyle I_c}$ is the moment of inertia in kg·mTemplate:Sup
• ${\displaystyle I_z}$ is the polar second moment of area in meters to the fourth power (m⁴)
• ${\displaystyle l}$ is the length of cylinder in meters (m)
• ${\displaystyle \rho }$ is the specific mass in kg/mTemplate:Sup

• Torsion constant
• Torsion spring
• Torsion bar suspension
• Second moment of area
• Shear modulus
• List of second moments of area

• Torsion of Shafts - engineeringtoolbox.com
• Elastic Properties and Young Modulus for some Materials - engineeringtoolbox.com
• Material Properties Database - matweb.com