Chilvera Bhanu Teja
Institute of Aeronautical Engineering (IARE), Hyderabad
Chilvera Bhanu Teja has created this Calculator and 200+ more calculators!
Vaibhav Malani
National Institute of Technology (NIT), Tiruchirapalli
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11 Other formulas that you can solve using the same Inputs

Impulsive Force
Impulsive Force=(Mass*(Final Velocity-Initial Velocity))/Time Taken to Travel GO
Magnetic Force
Magnetic Force=Current Magnitude*Length of Rod*Magnetic Field*sin(θ) GO
Specific Heat Capacity
Specific Heat Capacity=Energy Required/(Mass*Rise in Temperature) GO
Centripetal Force or Centrifugal Force when angular velocity, mass and radius of curvature are given
Centripetal Force=Mass*(Angular velocity^2)*Radius of Curvature GO
Potential Energy
Potential Energy=Mass*Acceleration Due To Gravity*Height GO
Moment of Inertia of a rod about an axis through its center of mass and perpendicular to rod
Moment of Inertia=(Mass*(Length of rod^2))/12 GO
Centripetal Force
Centripetal Force=(Mass*(Velocity)^2)/Radius GO
Moment of inertia of a circular ring about an axis through its center and perpendicular to its plane
Moment of Inertia=Mass*(Radius 1^2) GO
Kinetic Energy
Kinetic Energy=(Mass*Velocity^2)/2 GO
Force
Force=Mass*Acceleration GO
Density
Density=Mass/Volume GO

6 Other formulas that calculate the same Output

Mass moment of inertia of triangular plate about z-axis through centroid, perpendicular to plate
Mass moment of inertia about z-axis=(Mass/72)*((3*(Base of triangle^2))+(4*(Height of triangle^2))) GO
Mass moment of inertia of rectangular plate about z-axis through centroid, perpendicular to plate
Mass moment of inertia about z-axis=(Mass/12)*(Length of rectangle^2+Breadth of rectangle^2) GO
Mass moment of inertia of solid cylinder about z-axis through centroid, perpendicular to length
Mass moment of inertia about z-axis=(Mass/12)*((3*(Cylinder Radius^2))+(Cylinder Height^2)) GO
Mass moment of inertia of cuboid about z-axis passing through centroid
Mass moment of inertia about z-axis=(Mass/12)*((Length^2)+(Height^2)) GO
Mass moment of inertia of solid sphere about z-axis passing through centroid
Mass moment of inertia about z-axis=(2/5)*Mass*(Radius of Sphere^2) GO
Mass moment of inertia of circular plate about z-axis through centroid, perpendicular to plate
Mass moment of inertia about z-axis=(Mass*Radius^2)/2 GO

Mass moment of inertia of rod about z-axis passing through centroid, perpendicular to length of rod Formula

Mass moment of inertia about z-axis=(Mass*Length of Rod^2)/12
I<sub>zz</sub>=(m*l^2)/12
More formulas
Mass moment of inertia of rectangular plate about x-axis through centroid, parallel to length GO
Mass moment of inertia of rectangular plate about y-axis through centroid, parallel to breadth GO
Mass moment of inertia of rectangular plate about z-axis through centroid, perpendicular to plate GO
Mass moment of inertia of circular plate about z-axis through centroid, perpendicular to plate GO
Mass moment of inertia of circular plate about y-axis passing through centroid GO
Mass moment of inertia of circular plate about x-axis passing through centroid GO
Mass moment of inertia of triangular plate about x-axis passing through centroid parallel to base GO
Mass moment of inertia of triangular plate about y-axis passing through centroid, parallel to height GO
Mass moment of inertia of triangular plate about z-axis through centroid, perpendicular to plate GO
Mass moment of inertia of rod about y-axis passing through centroid, perpendicular to length of rod GO
Mass moment of inertia of solid cylinder about x-axis through centroid, perpendicular to length GO
Mass moment of inertia of solid cylinder about z-axis through centroid, perpendicular to length GO
Mass moment of inertia of solid cylinder about y-axis through centroid, parallel to length GO
Mass moment of inertia of cuboid about x-axis passing through centroid, parallel to length GO
Mass moment of inertia of cuboid about y-axis passing through centroid GO
Mass moment of inertia of cuboid about z-axis passing through centroid GO
Mass moment of inertia of solid sphere about x-axis passing through centroid GO
Mass moment of inertia of solid sphere about y-axis passing through centroid GO
Mass moment of inertia of solid sphere about z-axis passing through centroid GO
Mass moment of inertia of cone about x-axis passing through centroid, perpendicular to base GO
Mass moment of inertia of cone about y-axis perpendicular to height, passing through apex point GO
Mass of solid cylinder GO
Mass of cuboid GO
Mass of solid sphere GO
Mass of cone GO
Mass of rectangular plate GO
Mass of circular plate GO
Mass of triangular plate GO

What is mass moment of inertia?

Mass moment of inertia of a body measures the ability of body to resist changes in rotational speed about a specific axis. The larger the Mass Moment of Inertia the smaller the angular acceleration about that axis for a given torque. It basically characterizes the acceleration undergone by an object or solid when torque is applied.

How to Calculate Mass moment of inertia of rod about z-axis passing through centroid, perpendicular to length of rod?

Mass moment of inertia of rod about z-axis passing through centroid, perpendicular to length of rod calculator uses Mass moment of inertia about z-axis=(Mass*Length of Rod^2)/12 to calculate the Mass moment of inertia about z-axis, The Mass moment of inertia of rod about z-axis passing through centroid, perpendicular to length of rod formula is defined as the product of mass and square of length of the rod, divided by 12. Mass moment of inertia about z-axis and is denoted by Izz symbol.

How to calculate Mass moment of inertia of rod about z-axis passing through centroid, perpendicular to length of rod using this online calculator? To use this online calculator for Mass moment of inertia of rod about z-axis passing through centroid, perpendicular to length of rod, enter Mass (m) and Length of Rod (l) and hit the calculate button. Here is how the Mass moment of inertia of rod about z-axis passing through centroid, perpendicular to length of rod calculation can be explained with given input values -> 11.81667 = (35.45*2^2)/12.

FAQ

What is Mass moment of inertia of rod about z-axis passing through centroid, perpendicular to length of rod?
The Mass moment of inertia of rod about z-axis passing through centroid, perpendicular to length of rod formula is defined as the product of mass and square of length of the rod, divided by 12 and is represented as Izz=(m*l^2)/12 or Mass moment of inertia about z-axis=(Mass*Length of Rod^2)/12. Mass is the quantity of matter in a body regardless of its volume or of any forces acting on it and The length of the rod is defined as the total length of the conducting rod. .
How to calculate Mass moment of inertia of rod about z-axis passing through centroid, perpendicular to length of rod?
The Mass moment of inertia of rod about z-axis passing through centroid, perpendicular to length of rod formula is defined as the product of mass and square of length of the rod, divided by 12 is calculated using Mass moment of inertia about z-axis=(Mass*Length of Rod^2)/12. To calculate Mass moment of inertia of rod about z-axis passing through centroid, perpendicular to length of rod, you need Mass (m) and Length of Rod (l). With our tool, you need to enter the respective value for Mass and Length of Rod 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 Mass moment of inertia about z-axis?
In this formula, Mass moment of inertia about z-axis uses Mass and Length of Rod. We can use 6 other way(s) to calculate the same, which is/are as follows -
  • Mass moment of inertia about z-axis=(Mass/12)*(Length of rectangle^2+Breadth of rectangle^2)
  • Mass moment of inertia about z-axis=(Mass*Radius^2)/2
  • Mass moment of inertia about z-axis=(Mass/72)*((3*(Base of triangle^2))+(4*(Height of triangle^2)))
  • Mass moment of inertia about z-axis=(Mass/12)*((3*(Cylinder Radius^2))+(Cylinder Height^2))
  • Mass moment of inertia about z-axis=(Mass/12)*((Length^2)+(Height^2))
  • Mass moment of inertia about z-axis=(2/5)*Mass*(Radius of Sphere^2)
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