Answer to Question #217755 in Classical Mechanics for nela

Question #217755

It is required to project a body from a point on level ground in such a way

as to clear a thin vertical barrier of height h placed at a distance a from the

point of projection. Show that the body will just skim the top of the barrier

ga2

tan2 α − a tan α +

ga2

+ h

= 0

where u is the speed of projection and α is the angle of projection above the

horizontal

Expert's answer

Suppose that the motion starts from the origin and takes place in the .x; z/-plane,

where Oz points vertically upwards. Then the path of the body

"z=x\\tan \\alpha-\\frac{g}{2u^2\\cos^2{\\alpha}}x^2"

where u is the projection speed and "\\alpha" is the angle between the direction of projection and the positive x-axis. If the path just skims the top of the

barrier, then u and "\\alpha" must satisfy the equation

"h=a\\tan \\alpha-\\frac{g}{2u^2\\cos^2{\\alpha}}a^2"

On using the trigonometric identity

"\\sec^2\\alpha=1+\\tan^2\\alpha"

this condition can be written in the form

"ga^2\\tan^2\\alpha-2au^2\\tan \\alpha+(ga^2+2hu^2)=0"

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Answer to Question #217755 in Classical Mechanics for nela

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