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42 votes
42 votes

\huge \bf༆ question ༄

A block slides down an inclined plane of slope angle Φ with constant velocity. if it is then projected up the same plane with an initial speed " v " . the distance in which it will come to rest is ?

Find distance ~

There's no picture in the question, you are free to make it yourself as per the given information .

Thanks for Answering ~ ​

User Tolani
by
2.7k points

2 Answers

24 votes
24 votes

As the block is sliding down with constant velocity. Therefore friction force along the slope must be equal to the component of gravity along the slope.

μN = mgsin0

umgcose mgsine

=

μ = tane

When thrown up: Initial Velocity is Vo

Acceleration (both friction and

component of gravity acting downwards the slope as relative motion

is upwards) is µN + mgsin0 = tanmgcose +

mgsin0 = 2mgsin

Final Velocity is zero.

Therefore distance traveled up the incline is:

v² - u² = 2as

⇒ 0-V₂² =2(-2mgsin0)s

S = 4mgsin

User Sealroto
by
3.0k points
22 votes
22 votes

Refer to the attachment for calculations


{\boxed{\Large{\mathfrak{s=(v^2)/(4gsin\Theta)}}}}

How
\mugcos
\Theta turned to g
\sf sin\Theta?

Ans:-


\\ \sf\longmapsto \mu=tan\Theta

Put in expression


\\ \sf\longmapsto \mu g cos\Theta


\\ \sf\longmapsto tan\Theta g cos\Theta


\\ \sf\longmapsto (sin\Theta)/(cos\Theta)g cos\Theta


\\ \sf\longmapsto gsin\Theta

\huge \bf༆ question ༄ A block slides down an inclined plane of slope angle Φ with-example-1
\huge \bf༆ question ༄ A block slides down an inclined plane of slope angle Φ with-example-2
User Martin Shishkov
by
2.9k points