Which of the following equation does not represent a SHM?

Question

Which of the following equation does not represent a SHM? (A) cosω t + sinω t (B)  sinω t-cosω t  (C) 1 - sin2ω t (D)  sinω t+cos(ω t +α)

Tardigrade Admin · Accepted Answer

(a) (cos ω t + sin ω t) is a periodic function. It can also be written as =(√2/√2)sin ω t +(√2/√2)=cos ω t =√2 (cos (π/4) sin ω t +sin (π/4) cos ω t) =√2sin (ω t+ (π/4))=√2 sin (ω t+(π/4)+2π÷) =√2 sin[ω(t+(2π/ω) )+(π/4)] This represent a simple harmonic function with period (2π/ω) and phase (π/4). (b) sinω t - cosω t is a periodic function. It can be written as =√2[sin ω t cos (π/4)-cos ω t sin (π/4) ] =√2sin (ω t-(π/4)÷ )=√2sin [ω(t+(2π/ω)÷)-(π/4)] This represent a simple harmonic function with period (2π/ω). (c) F(t) = 1 - sin 2ω t This is a non periodic function. (d) F(t) = sinω t + cos(ω t + α) also represent a simple harmonic function.

Q. Which of the following equation does not represent a SHM?

$cos ω t + s inω t$

$s inω t - cos ω t$

$1 - s in 2 ω t$

$s inω t + cos (ω t + α)$

Q. Which of the following equation does not represent a SHM?

cosωt+sinωt

sinωt−cosωt

1−sin2ωt

sinωt+cos(ωt+α)

$cos ω t + s inω t$

$s inω t - cos ω t$

$1 - s in 2 ω t$

$s inω t + cos (ω t + α)$