I will be tested on this concept soon and would like to be shown all the steps necessary to complete this problem! Thank you! If a projectile is launched at an angle with the horizontal, its parametric equations are as follows.(70 sin(0))t — 16t²x = (70 cos(0))t and y =Find the angle that maximizes the range of the projectile.OUse a graphing utility to find the angle that maximizes the arc length of the trajectory. (Round your answer to one decimal place.)O

Given that: The projectile is launched at an angle. x=(70 cosθ)ty=(70 sinθ t)−16t2 It is required…

If a projectile is launched at an angle with the horizontal, its parametric equations are as follows. x = (70 cos(0))t and y = (70 sin(0))t - 16t² Find the angle that maximizes the range of the projectile. Use a graphing utility to find the angle that maximizes the arc length of the trajectory. (Round your answer to one decimal place.) O

If a projectile is launched at an angle with the horizontal, its parametric equations are as follows. x = (70 cos(0))t and y = (70 sin(0))t - 16t² Find the angle that maximizes the range of the projectile. Use a graphing utility to find the angle that maximizes the arc length of the trajectory. (Round your answer to one decimal place.) O

University Physics Volume 1

18th Edition

ISBN:9781938168277

Author:William Moebs, Samuel J. Ling, Jeff Sanny

Publisher:William Moebs, Samuel J. Ling, Jeff Sanny

Chapter2: Vectors

Section: Chapter Questions

Problem 67P: Assuming the +x-axis is horizontal to the right for the vectors in the previous figure, find the...

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