Answer:
a. 30 N / m
b. 9.0 N
Explanation:
Given that
Unstretched length of the spring, [tex]L_o[/tex] = 20.0cm = 0.2m
a) When the mass of 4.5N is hanging from the second spring, then extended length Is
[tex]L_1[/tex] = 35.0cm = 0.35m
So, the change in spring length when mass hangs is
[tex]x = L_1 - L_o[/tex]
= (0.35 - 0.20) m
= 0.15m
As spring are identical
Let us assume that the spring constant be "k", so at equilibrium
Restoring Force on spring = Block weightage
kx = W = 4.50
[tex]k= \frac{4.50}{x} = \frac{4.50}{0.15}[/tex]
= 30 N / m
b) Now for the third spring, stretched the length of spring is
[tex]L_2[/tex] = 50cm = 0.5m
So, the change in spring length is
[tex]x'= L_2 - L_o[/tex]
= (0.5-0.20)m
= 0.30m
At equilibrium,
Restoring Force on spring = Block weightage
Now using all mentioned and computed values in above,
[tex]W'= kx'[/tex]
= 30(0.3)
= 9.0 N
