Question

A particle performing S.H.M. has velocities of 8 cm/s and 6 cm/s at displacements of 3 cm and 4 cm respectively. Calculate the amplitude and period of S.H.M.

Answer 1

Given:

v₁ = 8 cm/s, v₂ = 6 cm/s, x₁ = 3 cm, x₂ = 4 cm

To find: Amplitude (A), Period (T)

Formula: v = ω`sqrt("A"^2 - "x"^2)`

Calculation: 

From the given condition,

`"v"_1^2 = ω^2("A"^2 - "x"_1^2)`

∴ 64 = ω²(A² − 9) .…(i)

Also, `"v"_2^2 = ω^2("A"^2 - "x"_2^2)` 

∴ 36 = ω²(A² − 16)  …(ii)

Dividing (i) by (ii),

`64/36 = ("A"^2 - 9)/("A"^2 - 16)`

∴ `16/9 = ("A"^2 - 9)/("A"^2 - 16)`

∴ 16A² − 256 = 9A² − 81 

∴ 7A² = 175

∴ A = 5 cm 

Substituting value of A in equation (i), we get,

64 = ω²(25 − 9) = 16 ω²

∴ ω² = 4

∴ ω = 2 rad/s

∴ `(2pi)/"T" = 2`

∴ T = π s = 3.14 s

The amplitude and period of S.H.M. of the particle are 5 cm and 3.14 s respectively.