A particle is moving along a straight line path according to the relation s2 = at2 + 2bt + c s represents the distance travelled in t seconds and a, b, c are constants. Then the acceleration of the particle varies as.

Question

A particle is moving along a straight line path according to the relation s2 = at2 + 2bt + c s represents the distance travelled in t seconds and a, b, c are constants. Then the acceleration of the particle varies as. (A) s-3 (B) s3/2 (C) s-2/3 (D) s2

Tardigrade Admin · Accepted Answer

s2 = at2 + 2bt + c ∴ 2s (ds/dt) = 2at + 2b or (ds/dt) = (at+b/s) , again differentiating (d2s/dt2) = (a.s - (at+b)/s2) . (ds/dt) = (as -(at+b)((at+b/s))/s2) ∴ (d2s/dt2) = (as2 - (at +b)2/s3) ∴ a = (d2s/dt2) ∞ s-3

Q. A particle is moving along a straight line path according to the relation $s^{2} = a t^{2} + 2 b t + c$ s represents the distance travelled in t seconds and a, b, c are constants. Then the acceleration of the particle varies as.

$s^{- 3}$

$s^{3/2}$

$s^{- 2/3}$

$s^{2}$

Q. A particle is moving along a straight line path according to the relation s2=at2+2bt+c s represents the distance travelled in t seconds and a, b, c are constants. Then the acceleration of the particle varies as.

s−3

s3/2

s−2/3

s2

s2=at2+2bt+c∴2sdtds​=2at+2b or dtds​=sat+b​ , again differentiating dt2d2s​=s2a.s−(at+b)​.dtds​ =s2as−(at+b)(sat+b​)​ ∴dt2d2s​=s3as2−(at+b)2​ ∴a=dt2d2s​∞s−3

Q. A particle is moving along a straight line path according to the relation $s^{2} = a t^{2} + 2 b t + c$ s represents the distance travelled in t seconds and a, b, c are constants. Then the acceleration of the particle varies as.

$s^{- 3}$

$s^{3/2}$

$s^{- 2/3}$

$s^{2}$