Answer:
Explanation:
Let the first object have a mass of M
And a period of T1=8sec
The second object has a mass 10kg and a period of T2=12 sec
It is know that,
The period of a spring-mass system is proportional to the square root of the mass and inversely proportional to the square root of the spring constant.
T=2π√(m/k)
Then the constant in this equation is the spring constant (k) and 2Ï€, which does not change for the same material.
Then, make k subject of formulas
T²=4π²(m/k)
T²k=4π²m
Then, k/4π²=m/T²
So the k is directly proportional to m and inversely proportional to T²
M1/T1²=M2/T2²
Since, M1 is unknown, M2=10kg, T1=8sec and T2=12
Then,
M1/T1²=M2/T2²
M1/8²=10/12²
M1/64=0.06944
M1=0.06944×64
M1=4.444kg
The mass of the first object is 4.44kg
