Answer:
0.337 kg
Step-by-step explanation:
Given:
length of wire 'l'= 3.80m
mass of suspended object 'M'= 54kg
transverse pulse 't'= 0.0492 s
mass of wire 'm' =?
we can calculate mass from the linear mass density formula i.e
μ = m/l ---> eq A
where m= mass and l=length
but first we have to calculate 'μ' linear mass density
we can determine the linear mass density μ by using the formula of wave in a string speed
v = sqrt (F/μ)---> eq 1
starting with the formula of wave speed that is
v= l / t
where, 'l' is the distance traveled and 't' is time interval
v= 3.80/ 0.0492 =>77.2 m/s
next is to apply newton's second law to the hanged mass in order to find force.
ΣF = F - Fg
F= Fg => Mg
F= 54.0 x 9.8
F = 529 N
putting the values of v and F in equation 1 we get;
77.2 = sqrt( 529/ μ) ---> taking square on both sides
μ= 529/ 5959.84
μ= 0.089kg/m
putting the values of μ and L in eq A, we get
μ= m/l
0.089= m / 3.80
m= 0.089 x 3.80
m = 0.337 kg
therefore, the mass of the wire is 0.337 kg