Two inclined frictionless tracks, one gradual and the other steep meet at A from where to stones are allowed to slide down from rest, one on each track (fig.) Will hte stones reach the bottom at the same time? Will they reach there with the same speed? Explain, given `theta_(1)=30^(@)`, `theta_92)=60^(@)` and h=10m. What are the speeds and time taken by the two stones?

Two inclined frictionless tracks, one gradual and the other steep meet

1.	Two inclined frictionless tracks, one gradual and the other steep meet at A from where to stones are allowed to slide down from rest, one on each track (fig.) Will hte stones reach the bottom at the same time? Will they reach there with the same speed? Explain, given `theta_(1)=30^(@)`, `theta_92)=60^(@)` and h=10m. What are the speeds and time taken by the two stones?
Answer» `1/2 mv^(2) = mgh, v=sqrt(2gh)` `=sqrt(2 xx 10 xx 10) ms^(-1) = 14.4 ms^(-1)` `v_(B) = v_(C) = 14.14ms^(-1), l=1/2(gsintheta)t^(2)` `sintheta = h/l, l=h/sintheta)` `h/sintheta = 1/2gsinthetat^(2)` or `t=sqrt((2h)/g.1/sintheta` `t_(B) = sqrt((2 xx 10)/10 1/(sin30^(@)) = 2sqrt(2)s` `t_(C) = sqrt((2 xx 10)/(10) . 1/(sin60^(@)) = (2sqrt(2))/(sqrt(3))s`

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