The density of a non-uniform of length 1 m is given by `rho(x) = a(1 + bx^(2))` where a and b are constants and 0 `le x le 1`. The centre of mass of the rod will be at

The density of a non-uniform rod of length 1m is given by rho (x) = a (1 + bx^(2)) where a and b are constants and 0 le x le 1 . The centre of mass of the rod will be at

The density of a non-uniform rod of length 1m is given by rho (x) = a (1 + bx^(2)) where a and b are constants and 0 le x le 1 . The centre of mass of the rod will be at

The linear density of a non - uniform rod of length 2m is given by lamda(x)=a(1+bx^(2)) where a and b are constants and 0lt=xlt=2 . The centre of mass of the rod will be at. X=

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)

A rod of length L is placed along the x-axis between x=0 and x=L . The linear mass density (mass/length) rho of the rod varies with the distance x from the origin as rho=a+bx . Here, a and b are constants. Find the position of centre of mass of this rod.

The density of a thin rod of length l varies with the distance x from one end as rho=rho_0(x^2)/(l^2) . Find the position of centre of mass of rod.

You are given a rod of length L. The linear mass density is lambda such that lambda=a+bx . Here a and b are constants and the mass of the rod increases as x decreases. Find the mass of the rod

The density of a rod of length L varies as rho=A+Bx where x is the distance from the left end. Locate the centre of mass.

A rod of length L and cross section area A has variable density according to the relation rho (x)=rho_(0)+kx for 0 le x le L/2 and rho(x)=2x^(2) for L/2 le x le L where rho_(0) and k are constants. Find the mass of the rod.

Find the x coordinate of the centre of mass of the non - uniform rod of length L givne below. The origin is taken at the left end of the rod. The density of the rod as a function of its x- coordinates is rho=ax^(2)+bx+c , where a, b and c are constants.