Find the maximum height of a rocket fired vertically

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SUMMARY

The maximum height of a rocket fired vertically with a constant acceleration of 2.86g for 50.2 seconds can be calculated using the formula s = 1/2 at^2. After the rocket motors are turned off, it continues to ascend until gravity decelerates it at 9.8 m/s². The height reached during the burn phase and the subsequent ascent under gravity must be combined to determine the total maximum height.

PREREQUISITES
  • Understanding of kinematic equations, specifically s = 1/2 at^2
  • Knowledge of gravitational acceleration (g = 9.8 m/s²)
  • Familiarity with concepts of constant acceleration and free fall
  • Basic algebra for solving quadratic equations
NEXT STEPS
  • Calculate the height reached during the burn phase using s = 1/2 (2.86 * 9.8) (50.2)^2
  • Apply the equation 2a(y - y_0) = v^2 - v_0^2 for the ascent after the burn
  • Explore the effects of air resistance on rocket motion
  • Study the principles of projectile motion and maximum height calculations
USEFUL FOR

Students studying physics, aerospace engineering enthusiasts, and anyone interested in the dynamics of rocket motion and kinematics.

galuda
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Homework Statement


A rocket is fired vertically, ejecting sufficient mass to move upward at a constant acceleration of 2.86g. After 50.2s, the rocket motors are turned off, and the rocket subsequently moves under the action of gravity alone, with negligible air resistance. Ignoring the variation of g with altitude, find the maximum height the rocket reaches.


Homework Equations


s = 1/2 at^2


The Attempt at a Solution


I guess during the burn i would use this formula to get .5(2.86*9.8)(50.2)^2, but i don't know where to go after that
 
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After the burn, the rocket will still be moving up but will be accelerating down at a rate of 9.8 meters per second squared.

So you can use this:

2a(y-y_0)=v^2-v_0^2

Where y_0 is the height of the rocket when the burn stopped. And a=-g.
 
oh thank you, that worked perfectly
 

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