A projectile is fired from surface of level ground

Question

A projectile is fired from surface of level ground at an angle ∅₀ above the horizontal. (a) Show that the elevation angle θ of the highest point as seen from the launch point is related to ∅ = src=data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAA0AAAAsCAIAAAAxeaW4AAAAhElEQVQ4jd3TwQ2AMAgF0D8XAzEP07BMh9GDRkpb0IMxrVz78vPTALZng8WcMsCauSKEYzKnTFJOnOdZ6A+cMgCSEjr7vWtc7Cx78KVrP6SaKfqt4ZSjnaqc28/RspqrHpS7yGE/5SjvRvUuOjjnBr16F56uc02pIuQrwrKy851gD95xO4s1BA+29WAOAAAAAElFTkSuQmCC

src=data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAA0AAAAsCAIAAAAxeaW4AAAAhElEQVQ4jd3TwQ2AMAgF0D8XAzEP07BMh9GDRkpb0IMxrVz78vPTALZng8WcMsCauSKEYzKnTFJOnOdZ6A+cMgCSEjr7vWtc7Cx78KVrP6SaKfqt4ZSjnaqc28/RspqrHpS7yGE/5SjvRvUuOjjnBr16F56uc02pIuQrwrKy851gD95xO4s1BA+29WAOAAAAAElFTkSuQmCC

tan ∅₀, See Fig. (b) Calculate θ for ∅₀ by tan θ src=data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAwAAAApCAIAAACOdl81AAAAgUlEQVQ4jdWT0Q3AIAhEby4GYh6mYRmGaT/aFFA0/TG196d5uZx44HghLIOUAdYhZEK4NISUSewmJ05u90dIGQCJ1ZBP6ZEbrvu7XaD27UGfZdoXUi5rEqBUtq55DoVb5WxWZlIunWZID5XrkqA2Sw/VK5egJogJhRPcZbh2W7bgBE1HFPDRqQ/hAAAAAElFTkSuQmCC

src=data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAwAAAApCAIAAACOdl81AAAAgUlEQVQ4jdWT0Q3AIAhEby4GYh6mYRmGaT/aFFA0/TG196d5uZx44HghLIOUAdYhZEK4NISUSewmJ05u90dIGQCJ1ZBP6ZEbrvu7XaD27UGfZdoXUi5rEqBUtq55DoVb5WxWZlIunWZID5XrkqA2Sw/VK5egJogJhRPcZbh2W7bgBE1HFPDRqQ/hAAAAAElFTkSuQmCC

tan ∅₀. See Fig. (b) Calculate θ for ∅₀ = 45°.

src=data:image/png;base64,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

Aditi Chauhan · Accepted Answer

Therefore, the angle of elevation corresponding to the maximum height of the projectile is 26.5&deg; .

Mechanics> A projectile is fired from surface of lev...

Simran Bhatia , 10 Years ago

Aditi Chauhan

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mechanics

A car loaded with water having total mass 1000 kg moves on a straight horizontal Road starting from rest under the action of a force of 100 Newton. The water spills throw a small hole in the bottom at a rate of 0.1 KG per second the velocity of cart after 300 seconds is nearly.

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mechanics

mechanics

mechanics

If a=x² find the displacement at t =3sec if body velocity at t= 0 sec is 0

mechanics

Mechanics> A projectile is fired from surface of lev...

Simran Bhatia , 10 Years ago

Aditi Chauhan

LIVE ONLINE CLASSES

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A car loaded with water having total mass 1000 kg moves on a straight horizontal Road starting from rest under the action of a force of 100 Newton. The water spills throw a small hole in the bottom at a rate of 0.1 KG per second the velocity of cart after 300 seconds is nearly.11213141

mechanics

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mechanics

If a=x² find the displacement at t =3sec if body velocity at t= 0 sec is 0

mechanics

A car loaded with water having total mass 1000 kg moves on a straight horizontal Road starting from rest under the action of a force of 100 Newton. The water spills throw a small hole in the bottom at a rate of 0.1 KG per second the velocity of cart after 300 seconds is nearly.

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21
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