If a rock is thrown upward with an initial velocity of 24.5 m/s where the downward acceleration due to gravity is 9.81 m/s2. what is the rock's displacement after 1.00 s?

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If a rock is thrown upward with an initial velocity of 24.5 m/s where the downward acceleration due to gravity is 9.81 m/s2. what is the rock's displacement after 1.00 s?

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Answer 1 · 2014-12-18T22:57:00

Solving this problem requires knowing the Galilean Equations of Motion for the case of constant acceleration.

$X_{o}$ $X_o$ - Initial position of the moving object,
$X (t)$ $X(t)$ - Position of the object after time $t$ $t$ ,
$v_{o}$ $v_o$ - Initial velocity of the object,
$v (t)$ $v(t)$ - Velocity of the object after time $t$ $t$ ,
$a$ $a$ - Acceleration (a constant)

The Galilean Equations of Motion :

$v (t) = v_{o} + a t;$ $v(t) = v_o + at;$ : velocity-time relation,
$X (t) - X_{o} = v_{o} t + \frac{1}{2} a t^{2}$ $X(t)-X_o = v_ot+1/2 at^2$ : displacement-time relation

Combining the above two relation one gets,

$v^{2} (X) = v_{o}^{2} + 2 a (X - X_{o})$ $v^2(X) = v_o^2+2a(X-X_o)$ : velocity-displacement relation

This Problem : Given $v_{o}$ $v_o$ and $a$ $a$ and we are asked to determine the displacement $X (t) - X_{o}$ $X(t)-X_o$ at time $t = 1.00 s$ $t=1.00s$ .

Given $v_o=24.5ms^{-1}, \qquad a=-g=-9.8ms^{-2}; \qquad t=1.00s$

For this purpose the displacement-time relation is useful.

$X(t)-X_o=v_ot-1/2 g.t^2 = 19.6 m$

The displacement after $1.00 s$ is $19.6 m$ .

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If a rock is thrown upward with an initial velocity of 24.5 m/s where the downward acceleration due to gravity is 9.81 m/s2. what is the rock's displacement after 1.00 s?

1 Answer

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