Perpendicular axis theorem

Working in Cartesian co-ordinates, the moment of inertia of the planar body about the ${\displaystyle z}$ axis is given by:[2]

${\displaystyle I_{z}=\int \left(x^{2}+y^{2}\right)\,dm=\int x^{2}\,dm+\int y^{2}\,dm=I_{y}+I_{x}}$

On the plane, ${\displaystyle z=0}$, so these two terms are the moments of inertia about the ${\displaystyle x}$ and ${\displaystyle y}$ axes respectively, giving the perpendicular axis theorem. The converse of this theorem is also derived similarly.

Note that ${\displaystyle \int x^{2}\,dm=I_{y}\neq I_{x}}$ because in ${\displaystyle \int r^{2}\,dm}$, r measures the distance from the axis of rotation, so for a y-axis rotation, deviation distance from the axis of rotation of a point is equal to its x co-ordinate.

• Parallel axis theorem
• Stretch rule