A straight rod of length `L` extends from `x=a` to `x=L+a`. Find the gravitational force exerts on a point mass `m` at `x=0` is (if the linear density of rod`mu=A+Bx^(2)`)

A straight of length L extends from x=a to x=L+a. the gravitational force it exerts on a point mass 'm' at x=0, if the mass per unit length of the rod is A+Bx^(2), is given by :

A straight of length L extends from x=a to x=L+a. the gravitational force it exerts on a point mass 'm' at x=0, if the mass per unit length of the rod is A+Bx^(2), is given by :

A straight rod of length 'l' extends from x=l to x=2l. If linear mass density of rod is mu=((mu_0)/(l^3)X^3) , then the gravitational force exerted by rod on a particle of mass m at x=0 , is

A straight rod of length 'l' extends from x=l to x=2l. If linear mass density of rod is mu=((mu_0)/(l^3)X^3) , then the gravitational force exerted by rod on a particle of mass m at x=0 , is

A rod of length l is pivoted about an end . Find the moment of inertia of the rod about this axis if the linear mass density of rod varies as rho = ax^(2) + b kg/m

A mass m is at a distance a from one end of a uniform rod of length l and mass M. Find the gravitational force on the mass due to the rod.

A mass m is at a distance a from one end of a uniform rod of length l and mass M. Find the gravitational force on the mass due to tke rod.

A mass m is at a distance a from one end of a uniform rod of length l and mass M. Find the gravitational force on the mass due to tke rod.