Find coordinates of mass center of a non-uniform rod of length L whose linear mass density lambda varies as lambda=a+bx, where x is the distance from the lighter end.

The centre of mass of a non-uniform rod of length L whose mass per unit length lambda is proportional to x^2 , where x is distance from one end

The centre of mass of a non-uniform rod of length L whose mass per unit length lambda is proportional to x^2 , where x is distance from one end

The centre of mass of a non uniform rod of length L whose mass per unit length lambda = (K x^(2))/(L) , where K is a constant and x is the distance from one end is

The centre of mass of a non uniform rod of length L whose mass per unit length lambda = K x^2 // L where K is a constant and x is the distance from one end is (A) (3L)/(4) (B) (L)/(8) (C) (K)/(L) (D) (3K)/(L)

The centre of mass of a non uniform rod of length L whoose mass per unit length varies asp=kx^(2)//L , (where k is a constant and x is the distance measured form one end) is at the following distances from the same end

The centre of mass of a non uniform rod of length L whoose mass per unit length varies as p=kx^(2)//L , (where k is a constant and x is the distance measured form one end) is at the following distances from the same end

The centre of mass of a non uniform rod of length L, whose mass per unit length varies as rho=(k.x^2)/(L) where k is a constant and x is the distance of any point from one end is (from the same end)