Moment of inertia of rectangle about centroidal axis along x-x parallel to breadth Solution

STEP 0: Pre-Calculation Summary
Formula Used
Moment of Inertia about x-x axis = Breadth of Rectangular Section*(Length of Rectangular Section^3/12)
Jxx = B*(Lrect^3/12)
This formula uses 3 Variables
Variables Used
Moment of Inertia about x-x axis - (Measured in Meter⁴) - Moment of Inertia about x-x axis is defined as the quantity expressed by the body resisting angular acceleration.
Breadth of Rectangular Section - (Measured in Meter) - Breadth of Rectangular Section is the shortest length.
Length of Rectangular Section - (Measured in Meter) - Length of Rectangular Section is the total distance from one end to other end, length is the longest side of rectangle.
STEP 1: Convert Input(s) to Base Unit
Breadth of Rectangular Section: 1.99 Meter --> 1.99 Meter No Conversion Required
Length of Rectangular Section: 2.01 Meter --> 2.01 Meter No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
Jxx = B*(Lrect^3/12) --> 1.99*(2.01^3/12)
Evaluating ... ...
Jxx = 1.3466663325
STEP 3: Convert Result to Output's Unit
1.3466663325 Meter⁴ --> No Conversion Required
FINAL ANSWER
1.3466663325 1.346666 Meter⁴ <-- Moment of Inertia about x-x axis
(Calculation completed in 00.020 seconds)

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Moment of Inertia in Solids Calculators

Moment of Inertia of Hollow Rectangle about Centroidal Axis x-x Parallel to Breadth
​ LaTeX ​ Go Moment of Inertia about x-x axis = ((Breadth of Rectangular Section*Length of Rectangular Section^3)-(Inner Breadth of Hollow Rectangular Section*Inner Length of Hollow Rectangle^3))/12
Moment of inertia of rectangle about centroidal axis along x-x parallel to breadth
​ LaTeX ​ Go Moment of Inertia about x-x axis = Breadth of Rectangular Section*(Length of Rectangular Section^3/12)
Moment of inertia of rectangle about centroidal axis along y-y parallel to length
​ LaTeX ​ Go Moment of Inertia about y-y axis = Length of Rectangular Section*(Breadth of Rectangular Section^3)/12
Moment of inertia of triangle about centroidal axis x-x parallel to base
​ LaTeX ​ Go Moment of Inertia about x-x axis = (Base of Triangle*Height of Triangle^3)/36

Moment of inertia of rectangle about centroidal axis along x-x parallel to breadth Formula

​LaTeX ​Go
Moment of Inertia about x-x axis = Breadth of Rectangular Section*(Length of Rectangular Section^3/12)
Jxx = B*(Lrect^3/12)

What is moment of inertia?

Moment of inertia is defined as the quantity expressed by the body resisting angular acceleration which is the sum of the product of the mass of every particle with its square of a distance from the axis of rotation.

How to Calculate Moment of inertia of rectangle about centroidal axis along x-x parallel to breadth?

Moment of inertia of rectangle about centroidal axis along x-x parallel to breadth calculator uses Moment of Inertia about x-x axis = Breadth of Rectangular Section*(Length of Rectangular Section^3/12) to calculate the Moment of Inertia about x-x axis, Moment of inertia of rectangle about centroidal axis along x-x parallel to breadth formula is defined as the product of breadth of rectangle and cube of the length of rectangle divided by 12. Moment of Inertia about x-x axis is denoted by Jxx symbol.

How to calculate Moment of inertia of rectangle about centroidal axis along x-x parallel to breadth using this online calculator? To use this online calculator for Moment of inertia of rectangle about centroidal axis along x-x parallel to breadth, enter Breadth of Rectangular Section (B) & Length of Rectangular Section (Lrect) and hit the calculate button. Here is how the Moment of inertia of rectangle about centroidal axis along x-x parallel to breadth calculation can be explained with given input values -> 1.346666 = 1.99*(2.01^3/12).

FAQ

What is Moment of inertia of rectangle about centroidal axis along x-x parallel to breadth?
Moment of inertia of rectangle about centroidal axis along x-x parallel to breadth formula is defined as the product of breadth of rectangle and cube of the length of rectangle divided by 12 and is represented as Jxx = B*(Lrect^3/12) or Moment of Inertia about x-x axis = Breadth of Rectangular Section*(Length of Rectangular Section^3/12). Breadth of Rectangular Section is the shortest length & Length of Rectangular Section is the total distance from one end to other end, length is the longest side of rectangle.
How to calculate Moment of inertia of rectangle about centroidal axis along x-x parallel to breadth?
Moment of inertia of rectangle about centroidal axis along x-x parallel to breadth formula is defined as the product of breadth of rectangle and cube of the length of rectangle divided by 12 is calculated using Moment of Inertia about x-x axis = Breadth of Rectangular Section*(Length of Rectangular Section^3/12). To calculate Moment of inertia of rectangle about centroidal axis along x-x parallel to breadth, you need Breadth of Rectangular Section (B) & Length of Rectangular Section (Lrect). With our tool, you need to enter the respective value for Breadth of Rectangular Section & Length of Rectangular Section 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 Moment of Inertia about x-x axis?
In this formula, Moment of Inertia about x-x axis uses Breadth of Rectangular Section & Length of Rectangular Section. We can use 2 other way(s) to calculate the same, which is/are as follows -
  • Moment of Inertia about x-x axis = ((Breadth of Rectangular Section*Length of Rectangular Section^3)-(Inner Breadth of Hollow Rectangular Section*Inner Length of Hollow Rectangle^3))/12
  • Moment of Inertia about x-x axis = (Base of Triangle*Height of Triangle^3)/36
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