How to find the optimum angle for takeoff for ski jump using

AI Thread Summary
To determine the optimum takeoff angle for ski jumping using projectile motion, the focus should be on maximizing horizontal range. The key formula involves the relationship R(Θ) = Vi²/g * sin2Θ, which applies when takeoff and landing heights are the same. If the landing height differs from the takeoff height, adjustments must be made using the fundamental SUVAT equations. Clarifying the problem statement is crucial to ensure accurate calculations. Understanding these principles will lead to a more precise solution for the optimum angle.
canycorns44
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Homework Statement


I need to find how to find the optimum angle for take off on the ski flying hill using projectile motion. and why?

Homework Equations


formula-for-trajectory-of-projectile-motion.png


The Attempt at a Solution


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I'm just confused, because would I just use all the formulas above to solve the problem? or do I have to create another formula?
The optimum angle would result in the maximum horizontal range, right?
We know the time of flight = 2Vyi/g so the range = Vxi*2Vyi/g = 2Vi²/g *sinΘ*cosΘ =
R(Θ) = 2Vi²/g *sinΘ*cosΘ = Vi²/g *sin2Θ
 
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The first and last equations you quote assume landing at the same height as take-off. Is that case in your question?
(Always best to quote the whole question word for word in your post, in case you have misinterpreted something.)
 
so how would I write it if the landing it different from the takeoff?
 
canycorns44 said:
so how would I write it if the landing it different from the takeoff?
Go back to the more fundamental ("SUVAT") equations from which those are derived.
 
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