Linear mass density of a rod AB ( of length 10 m) varied with distance x from its end A as `lambda = lambda_0 x^3` (`lamda_0` is poitive constant). Distance of centre of mass the rod, form end B is

Linear mass density of a rod AB(of length 10 m) varies with distance x from its end A as lambda = lambda_0x^3 ( lambda_0 is positive constant) . Distance of centre of mass of the rod , from end B is

The linear mass density of a thin rod AB of length L varies from A to B as lambda (x) =lambda_0 (1 + x/L) . Where x is the distance from A. If M is the mass of the rod then its moment of inertia about an axis passing through A and perpendicualr to the rod is :

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 linear charge density of a thin metallic rod varies with the distance x from the end as lambda=lambda_(0)x^(2)(0 le x lel) The total charge on the rod is

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.

Linear mass density of a rod PQ of length l and mass m is varying with the distance x (from P), as lambda = (m)/(2l)(1+ax) (i) Determine the value of a (ii) Also determine the distance of c.m. from the end P.

The linear density of a thin rod of length 1m lies as lambda = (1+2x) , where x is the distance from its one end. Find the distance of its center of mass from this end.

Linear mss density (mass/length) of a rod depends on the distanec from one end (say A) as lamda_(x)=(alphax+beta) here alpha and beta are constants, find the moment of inertia of this rod about an axis passing through A and perpendicular to the rod. Length of the rod is l .

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 non uniform rod OM (of length l m) is kept along x-axis and rotating about an axis AB, which is perpendicular to rod as shown in the figure. The rod has linear mass density that varies with the distance x from left end of the rod according to lamda=lamda_(0)((x^(3))/(L^(3))) Where unit of lamda_(0) is kg/m. What is the value of x so that moment of inertia of rod about axis AB (I_(AB)) is minimum?