A wave pulse starts propagating in +x-direction along a non-uniform wire of length L witdt mass per unit length given `mu=m_(0)+alpha x` and under tension of TN. Find the time taken by the pulse to travel from the lighter end (x = 0) to the heavier end.

A wave pulse starts propagating in the +x-direction along a non-uniform wire of length 10 m with mass per unit length given by mu=mu_(0)+az and under a tension of 100 N. find the time taken by a pulse to travel from the lighter end (x=0) to the heavier end. (mu_(0)=10^(2) kg//m and a=9xx10^(-3)kg//m^(2)).

A mass of 10m long wire is 100gm. If a tension of 100N is applied, what is the time taken by transverse wave to travel from one end to the other end of the wire ?

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 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 wave pulse is travelling on a string of linear mass density 1.0 g cm^(-1) under a tension of 1 kg wt. Calculate the time taken by the pulse to travel a distance of 50 cm on the string.Given g = 10 ms^(-2) .

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

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

A uniform copper wire of length L , mass M and density rho is under a tension T . If the speed of the transverse wave along the wire is v, then area of cross section (A) of the wire is

The mass per unit length of a non - uniform rod of length L is given mu = lambda x^(2) , where lambda is a constant and x is distance from one end of the rod. The distance of the center of mas of rod from this end is