Projectiles launched at an angle.

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The discussion revolves around calculating the maximum height of a motorcycle jump launched at an angle of 12 degrees, covering a horizontal distance of 76.5 meters. Initial velocity calculations yielded 43.3 m/s, with a time of flight of 1.8 seconds, but there were discrepancies in the results, leading to confusion about the correct values. Participants shared different methods for deriving the initial velocity and time, with one suggesting an alternative approach that resulted in a velocity of 13.58 m/s and a time of 5.758 seconds. The calculations for height using these values were also debated, emphasizing the importance of accurate input for projectile motion equations. The thread highlights the complexity of projectile motion problems and the need for precise calculations to achieve correct results.
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Homework Statement



In 1991, Doug Danger rode a motorcycle to jump a horizontal distance of 76.5m. Find the maximm height of the jump if his angle with respect to the ground was 12.0?.

Homework Equations



Initial Velocity= ?g?x/2(sin ?)(cos ?)
?t= ?x/vi(cos ?)
?y= vi(sin ?)?t+1/2g(?t)^2

The Attempt at a Solution



vi= ?(9.81m/s/s)(76.5m)/2(sin 12?)(cos 12?)
vi= 43.3 m/s

?t= 76.5m/(43.3m/s)(cos 12?)
?t= 1.8s

?y= (43.3m/s)(sin 12?)(1.8s)+.5(-9.81m/s/s)(1.8s)^2
Not sure if this is right...
 
Last edited:
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I got V = 60.74 m/s and t = 2.575 s. Your answer of 43.3 m/s and 1.8 seconds will produce 76.23 meter horizontal distance.
I used Vcos(12)*t = 76.5 and 0 = Vsin(12) - gt to get t = Vsin(12)/g... so t = 0.0212V, multiplied by 2, t = 0.424V, then, V = 13.58 m/s, t = 5.758 s from here you may use

H = Vcos(12)t - 0.5gt^2
 
Thanks for the help.
 

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