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Piotr Falkowski · Answer 1 · 2021-02-10T10:21:50+0000

Answer:

Approximately
$1.6* 10^(3)\; \rm N$ .

Step-by-step explanation:

By the Impulse-Momentum Theorem, the change in this woman's momentum will be equal to the impulse that is applied to her.

The momentum
of an object is equal to the product of its mass
and velocity
. That is:
$p = m \cdot v$ .

Let
$v(\text{before})$ and
$v(\text{after})$ represent the velocity of the woman before and after the landing. Let
represent the woman's mass.

The woman's momentum before the landing would be
$m \cdot v(\text{before})$ .
The woman's momentum after the landing would be
$m \cdot v(\text{after})$ .

Therefore, the change in this woman's momentum would be:

$\begin{aligned}& \Delta p \\ & = p(\text{after}) - p(\text{before}) \\ &= m \cdot (v(\text{after})- v(\text{before}))\end{aligned}$ .

On the other hand, impulse is equal to force multiplied by the duration of the force. Let
represent the average force on the woman. The impulse on her during the landing would be
$F \cdot t$ .

Apply the Impulse-Momentum Theorem.

Impulse:
$F\cdot t$ .
Change in momentum:
$m \cdot (v(\text{after})- v(\text{before}))$ .

Impulse is equal to the change in momentum:

$F \cdot t = m \cdot (v(\text{after})- v(\text{before}))$ .

After landing, the woman comes to a stop. Her velocity would become zero. Therefore,
$v(\text{after}) = 0\; \rm m \cdot s^(-1)$ .

$\begin{aligned}F &= \displaystyle \frac{m \cdot (v(\text{after})- v(\text{before}))}{t} \\ &= \frac{50.5\; \text{kg} * \left(0 \; \mathrm{m \cdot s^(-1)}- 8.4\; \mathrm{m \cdot s^(-1)}\right)}{0.27\; \rm s} \\ &\approx 1.6 * 10^(3)\; \rm N\end{aligned}$ .

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