A point mass oscillates along the X -axis according to the relation x=x0cos(.ω t-π /4.). If acceleration of the particle is written as a=a0cos(.ω t+δ.), then

Question

A point mass oscillates along the X -axis according to the relation x=x0cos(.ω t-π /4.). If acceleration of the particle is written as a=a0cos(.ω t+δ.), then (A) a0=x0ω 2,δ=-π /4 (B) a0=x0ω 2,δ=π /4 (C) a0=x0ω 2,δ=-3π /4 (D) a0=x0ω 2,δ=3π /4

Tardigrade Admin · Accepted Answer

x=x0cos(.ω t-π /4.) v=(d x/d t)=-x0ω sin(.ω t-π /4.) a=(d v/d t)=-x0(ω )2cos(.ω t-π /4.) =+x0(ω )2cos[.π +(.ω t-π /4.)]. =x0(ω )2cos(.ω t+3π /4.) Comparing it with given equation, a=a0cos(.ω t+δ.) ⇒ a0=x0ω 2 and δ=(3 π /4)

Q. A point mass oscillates along the $X$ -axis according to the relation $x = x_{0} cos (ω t - π /4) .$ If acceleration of the particle is written as $a = a_{0} cos (ω t + δ),$ then

$a_{0} = x_{0} ω^{2}, δ = - π /4$

$a_{0} = x_{0} ω^{2}, δ = π /4$

$a_{0} = x_{0} ω^{2}, δ = - 3 π /4$

$a_{0} = x_{0} ω^{2}, δ = 3 π /4$

Q. A point mass oscillates along the X -axis according to the relation x=x0​cos(ωt−π/4). If acceleration of the particle is written as a=a0​cos(ωt+δ), then

a0​=x0​ω2,δ=−π/4

a0​=x0​ω2,δ=π/4

a0​=x0​ω2,δ=−3π/4

a0​=x0​ω2,δ=3π/4

x=x0​cos(ωt−π/4) v=dtdx​=−x0​ωsin(ωt−π/4) a=dtdv​=−x0​(ω)2cos(ωt−π/4) =+x0​(ω)2cos[π+(ωt−π/4)] =x0​(ω)2cos(ωt+3π/4) Comparing it with given equation, a=a0​cos(ωt+δ) ⇒a0​=x0​ω2 and δ=43π​

Q. A point mass oscillates along the $X$ -axis according to the relation $x = x_{0} cos (ω t - π /4) .$ If acceleration of the particle is written as $a = a_{0} cos (ω t + δ),$ then

$a_{0} = x_{0} ω^{2}, δ = - π /4$

$a_{0} = x_{0} ω^{2}, δ = π /4$

$a_{0} = x_{0} ω^{2}, δ = - 3 π /4$

$a_{0} = x_{0} ω^{2}, δ = 3 π /4$