French, asked by Anonymous, 7 months ago

5. A balloon starts rising from ground from rest with an upward acceleration 2 m/s2. Just after 1 s, a stone is dropped from it. The time taken by stone to strike the ground is nearly ​


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Answered by Anonymous
1

Answer:

EXPLANATION.

A balloon starts rising from ground from rest

with an acceleration = 2 m/s².

After, 1 seconds a stone is dropped from it.

To find time taken by the stone to strike

the ground is nearly.

 \sf :  \implies \: a \:  = 2ms {}^{ - 2}  \\  \\ \sf :  \implies \: balloon \: starts \: from \: rest \:   = u = 0 \\  \\ \sf :  \implies \: time \: taken \:  = 1 \: seconds \\  \\ \sf :  \implies \:  \green{{ \underline{from \: newton \: 1 {}^{st}equation \: of \: kinematics }}} \\  \\ \sf :  \implies \: v \:  = u + at \\  \\ \sf :  \implies \: v \:  = 0  \: +  \: 2 \times 1 = 2ms {}^{ - 1}

\sf :  \implies \: distance \: travelled \: by \: balloon \: in \: 1 \: seconds \\  \\ \sf :  \implies \:  \green{{ \underline{from \: newton \: 3 {}^{rd}  equation \: of \: kinematics}}} \\  \\ \sf :  \implies \:  {v}^{2}  =  {u}^{2} + 2as \\  \\  \sf :  \implies \: s \:  =  \frac{ {v}^{2} -  {u}^{2}  }{2a}  \\  \\ \sf :  \implies \: s \:  =  \frac{4 - 0}{4}  = 1 \\  \\ \sf :  \implies \: s \:  = 1 \: m

\sf :  \implies \: the \: acceleration \: of \: stone \: after \: dropped \: is \:  \\  \\ \sf :  \implies \: u \:  =  - 2ms {}^{ - 1}  \\  \\ \sf :  \implies \: a \:  = 9.8ms {}^{2} \\  \\  \sf :  \implies \: s \:  = 1 \: m \:  \\  \\ \sf :  \implies \: t \:  = 1  \: seconds

\sf :  \implies \:  \green{{ \underline{from \: newton \: 2 {}^{nd}equation \: of \: kinematics }}} \\  \\ \sf :  \implies \: s \:  = ut \:  +  \:  \frac{1}{2} a {t}^{2} \\  \\  \sf :  \implies \: 1 =  - 2t \:  +  \:  \frac{1}{2}  \times 9.8 \times {t}^{2}  \\  \\ \sf :  \implies \: 4.9 {t}^{2}  - 2t \:  - 1 = 0

\sf :  \implies \: factorise \: in \: the \: form \: of \: quadratic \: equation \\  \\ \sf :  \implies \: x \:  =  \frac{ - b \pm \:  \sqrt{ {b}^{2} - 4ac } }{2a} \\  \\  \sf :  \implies \: t \:  =  \frac{2 \pm \:  \sqrt{( - 2) {}^{2} - 4 \times 4.9 \times ( - 1) } }{2 \times 9.8}  \\  \\  \\ \sf :  \implies \: t \:  =  \frac{2 \pm \:  \sqrt{4 + 19.6} }{2 \times 9.8}  \\  \\ \sf :  \implies \: t \:  =  \frac{2 \pm \:  \sqrt{23.6} }{9.8}  \\  \\ \sf :  \implies \: t \:  = 0.7 \:  \: seconds

\sf :  \implies \: \green{ { \underline{time \: taken \: by \: stone \: to \: strike \: the \: ground \: nearly \:  = 0.7 \: seconds}}}

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