10th Edition

ISBN: 9780321979070

Author: Michael Sullivan

Publisher: PEARSON

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Chapter 3.5, Problem 37AYU

Artillery A projectile Fired from the point $(0, 0)$ at an angle to the positive x-axis has a trajectory given by

$y = c x - (1 + c^{2}) (\frac{g}{2}) {(\frac{x}{v})}^{2}$

where

$x =$ horizontal distance in meters

$y =$ height in meters

$v =$ initial muzzle velocity in meters per second (m/sec)

$g =$ acceleration due to gravity $= 9.81$ meters per second squared (m/sec2)

$c > 0$ is a constant determined by the angle of elevation.

A howitzer Fires an artillery round with a muzzle velocity of 897 m/sec.

(a) If the round must clear a hill 200 meters high at a distance of 2000 meters in front of the howitzer, what $c$ values are permitted in the trajectory equation?

(b) If the goal in part (a) is to hit a target on the ground 75 kilometers away, is it possible to do so? If so, for what values of $c$ ? If not, what is the maximum distance the round will travel?

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Chapter 3.5, Problem 36AYU

Chapter 3.5, Problem 38AYU

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Solution Summary: The author explains how to calculate the trajectory equation for an artillery round that must clear a hill 200 meters high.

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