If a rocket with a mass of 2900 tons vertically accelerates at a rate of $\frac{2}{9} \frac{m}{s^{2}}$ $2/9 m/s^2$ , how much power will the rocket have to exert to maintain its acceleration at 6 seconds?

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If a rocket with a mass of 2900 tons vertically accelerates at a rate of $\frac{2}{9} \frac{m}{s^{2}}$ $2/9 m/s^2$ , how much power will the rocket have to exert to maintain its acceleration at 6 seconds?

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Answer 1 · 2016-02-16T21:01:06

First work out what force the rocket is exerting to accelerate. Then use: Power = Force x Velocity.

The rocket's power is approximately 35.9 MW after 6 seconds.

Explanation:

The first step is to find what resultant upward force needs to be exerted by the rocket to make it accelerate upwards at $\frac{2}{9} m s^{- 2}$ $2/9 m s^-2$ , which we shall denote as $a_{r}$ $a_r$ . The resultant force $F$ $F$ is equal to the upward force provided by the rocket's motor, $F_{r}$ $F_r$ , minus the force of gravity $F_{g}$ $F_g$

Resultant upward force = upward forces - downward forces

$F = F_{r} - F_{g}$ $F = F_r - F_g$
Rearrange to make $F_{r}$ $F_r$ the subject:
$F_{r} = F + F_{g}$ $F_r = F + F_g$

Newton's 2nd law tells us that:
F = m a
The question tells us the upward acceleration is: $a_{r} = \frac{2}{9} m s^{- 2}$ $a_r=2/9 m s^-2$ , which is provided by the resultant force, so:

$F = m_{r} \times a_{r}$ $F = m_r times a_r$
where $m_{r}$ $m_r$ is the rocket's mass.

$F_{g} = m_{r} \times acceleration due to gravity = m_{r} \times g$ $F_g = m_r times text(acceleration due to gravity) = m_r times g$
Now:
$F_{r} = m_{r} \times a_{r} + m_{r} \times g = m_{r} (a_{r} + g)$ $F_r =m_r times a_r + m_r times g = m_r(a_r + g)$

With an expression for the force, we can now address the power:

Power = Force x Velocity
Velocity = acceleration x time
Power = $m_{r} (a_{r} + g) \times (a_{r} \times t)$ $m_r(a_r + g) times (a_r times t)$

I see you're from the USA, so we'll use US tons (aka short tons).

$m_{r} = 2900 tons ≅ 2900 tons \times 907 kg per ton = 2630300 kg$ $m_r = 2900 text( tons) ~= 2900 text( tons) times 907 text( kg per ton = 2630300 kg$

$a_{r} = \frac{2}{9} m s^{- 2}$ $a_r = 2/9 m s^-2$
$g ≅ 10 m s^{- 2}$ $g ~= 10 m s^-2$ (use a more accurate value if you want)
t = 6 seconds

Finally, putting it all together:
Power $≅ (2630300 k g) (\frac{92}{9} m s^{- 2}) \times \frac{2}{9} m s^{- 2} \times 6 s$ $~= (2630300 kg)(92/9 m s^-2) times 2/9 m s^-2 times 6s$
Power $≅ (\frac{241987600}{9} N) \times \frac{12}{9} m s^{- 1}$ $~= (241987600/9 N) times 12/9 m s^-1$
Power $≅ 35850015 J s^{- 1} = 35850015$ $~= 35850015 J s^-1 = 35850015$ watts

Thus the rocket's power is approximately 35.9 MW after 6 seconds.

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If a rocket with a mass of 2900 tons vertically accelerates at a rate of $\frac{2}{9} \frac{m}{s^{2}}$ $2/9 m/s^2$ , how much power will the rocket have to exert to maintain its acceleration at 6 seconds?

1 Answer

Explanation:

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If a rocket with a mass of 2900 tons vertically accelerates at a rate of 29ms2 2/9 m/s^2, how much power will the rocket have to exert to maintain its acceleration at 6 seconds?

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If a rocket with a mass of 2900 tons vertically accelerates at a rate of $\frac{2}{9} \frac{m}{s^{2}}$ $2/9 m/s^2$ , how much power will the rocket have to exert to maintain its acceleration at 6 seconds?