A non-uniform rod AB has a mass M and length 2L the mass per unit length of the rod is #mx# at a point of the rod distant #x# from A. Then what is the moment of inertia of this rod about an axis perpendicular to the rod?

1)through A
2)through the midpoint of AB

1 Answer
Jan 22, 2018

See below.

Explanation:

From #A#

#I_A=int_0^(2L)m(x)x^2 dx = m int_0^(2L)x^3 dx = m/4(2L)^4=4mL^4#

From the midpoint of #[AB]#

Using the Huygens–Steiner theorem we have

#I_([AB]/2) = I_A-M L^2#

Here #M = int_0^(2L)mx dx = 1/2m(2L)^2 = 2mL^2#

and then

#I_([AB]/2) =4mL^4-2mL^2 xx L^2 = 2mL^4#