Dynamics

Momentum in terms of force

Physics

STATEMENT:

Consider a spherical body of mass “ $m$ ”, moving with initial velocity “ $v_i$ ”. A force “ $F$ ” acts on a body to produce acceleration “ $a$ ”, therefore after time “ $t$ ” the body is found to be moving with final velocity “ $v_f$ ”. Let, “ $p_i$ ” & “ $p_f$ ” respectively represents the initial and final momentum of the body and “ $\Delta p$ ” represents the change in momentum of the body.

DERIVATION:

Since, mass “ $m$ ” is constant. Hence, the change in momentum is due to the change in velocity of body.

Initial Momentum = $p_i$ = $m\thinspace v_i$

Final Momentum = $p_f$ = $m \thinspace v_f$

Hence,

Change in momentum = $p_f - p_i$

$\Delta p = p_f -p_i$

$\Delta p = m \thinspace v_f - m \thinspace v_i$

$\Delta p = m( \thinspace v_f - \thinspace v_i)$

Divide by “ $t$ ” on both sides:

$\boxed {\frac{\Delta p}{t} = m \frac{( \thinspace v_f - \thinspace v_i)}{t}}$ ………. (i)

We know that

$\boxed {a = \frac{( \thinspace v_f - \thinspace v_i)}{t}}$

Substitute value in equation (i):

Hence,

$\boxed {\frac{\Delta p}{t} = m \thinspace a}$ ………… (ii)

Since, $F = m \thinspace a$

Therefore, equation (ii) becomes:

$\boxed {\frac{\Delta p}{t} = F}$

CONCLUSION:

Since, rate of change in momentum = $F$

So, we can define the relation as follows:

“The rate of change in momentum of a body is equal to the force applied on the body”.