Physics, asked by pragyanshree8615, 1 year ago

A stone is allowed to fall on the top of a 100 m high and at the same timeanother stone is projected vertically upwards from the ground at the velocity of 25m/s. At what position and time will the 2 stone meet

Answers

Answered by gooddaythugs3
3

let "t" = time after which both stones meet


"S" = distance travelled by the stone dropped from the top of tower


(100-S) = distance travelled by the projected stone.



◆ i) For stone dropped from the top of tower


-S = 0 + 1/2 (-10) t²


or, S = 5t²



◆ ii) For stone projected upward


(100 - S) = 25t + 1/2 (-10) t²


= 25t - 5t²



Adding i) and ii) , We get


100 = 25t


or t = 4 s



Therefore, Two stones will meet after 4 s.



◆ ¡¡¡) Put value of t = 4 s in Equation i) , we get


S = 5 × 16


= 80 m.



Thus , both the stone will meet at a distance of 80 m from the top of tower


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Answered by Anonymous
4

_/\_Hello mate__here is your answer--

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⚫Let the two stones meet after a time t.

CASE 1 :-When the stone dropped from the tower

u = 0 m/s

g = 9.8 ms−2

Let the displacement of the stone in time t from the top of the tower be s.

From the equation of motion,

s = ut + 1/2gt^2

⇒s = 0 × + 1/2× 9.8 ×t ^2

⇒ s = 4.9t^2 …………………… . (1)

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CASE 2 :--When the stone thrown upwards

u = 25 ms−1

g = −9.8 ms−2(upward direction)

Let the displacement of the stone from the ground in time t be '

Equation of motion,

s' = ut+ 1/2gt^2

⇒s′ = 25 × − 1/2× 9.8 × t^2

⇒s′ = 25 − 4.9t^2 …………………… . (2)

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Given that the total displacement is 100 m.

s′ + s = 100

⇒ 25 − 4.9t^2 + 4.9t^2 = 100

⇒ t =100 /25 = 4 s

The falling stone has covered a distance given by (1) as = 4.9 × 4^2 = 78.4 m

Therefore, the stones will meet after 4 s at a height (100 – 78.4) = 20.6 m from the ground.

I hope, this will help you.☺

Thank you______❤

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