A rock is dropped from a height of 2.5 meters. What is its velocity when it reaches the ground?

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A rock is dropped from a height of 2.5 meters. What is its velocity when it reaches the ground?

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Answer 1 · 2016-12-17T20:33:39

The velocity of the rock when it reaches the ground is $7 \frac{m}{s}$ $7 m/s$ .

Explanation:

The formula we are using is $V_"2"^2=V_"1"^2+2aDeltad$
=> Where $V$ is the velocity in $m/s$ .
=> Where $a$ is acceleration in $m/s^2$ .
=> Where $Deltad$ is the change in displacement in $m$ .

So now we just plug in the numbers.

$V_"2"^2=V_"1"^2+2aDeltad$

$=0+2(9.8)(2.5)$

$=sqrt49$

$=7$

The velocity of the rock when it reaches the ground is $7 m/s$ .

Hope this helps :)

Answer 2 · 2017-02-01T22:10:23

The velocity of the rock when it hits the ground is $7"m"/"s"$ .

Explanation:

The kinematic equation required to answer this question is:

$v_f^2=v_i^2+2ad$ , where $v_f$ is the final velocity, $v_i$ is the initial velocity, $a$ is acceleration, which is that of gravity, so we use $g$ instead, and $d$ is displacement.

First determine what information is given or known, and what is unknown.

Given/Known
$v_i="0 m/s"$
$g=-9.8 "m/s"^2"$
$d="-2.5 m"$

Unknown
$v_f$ (the velocity when it reaches the ground)

Equation

$v_f^2=v_i^2+2gd$

Substitute the known/given values into the equation.

$v_f^2=0+2*-9.8"m"/"s"^2*-2.5"m"$

$v_f^2=49"m"^2/"s"^2$

$v_f=sqrt(49"m"^2/"s"^2)$

$v_f=7"m"/"s"$

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A rock is dropped from a height of 2.5 meters. What is its velocity when it reaches the ground?

2 Answers

Explanation:

Explanation:

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