CPhill

I got the same answer as Melody, but with a slightly different approach.....

Here are all the "sets" ot the positions that the "separated" children can occupy :

1 3 5         2 4 6 

1 3 6         2 4 7

1 3 7         2 5 7    

1 4 6         3 5 7

1 4 7

1 5 7

And for each set, the "separarted"  children can be arranged in 3! ways

And for each of these arrangements, the other four children can be arranged in 4! ways in the other 4 positions.........so

10 sets * 3! arrangements of the separated set * 4! arrangements of the other children =  1440 total arrangements.......

The second is correct.....

5.8 x 10^-7  = .00000058

Yeah...Dragonlance.......it's the same equation as the second one I used......since t is positve, I beileve that 5.7 s   will be the correct answer....

Here's a graph of the solution.....https://www.desmos.com/calculator/uojhmuqlau

[ If it IS the solution.....I'm still not sure about this one....!!!]

You could be correct, Dragonlance......if so....I think we might have this formula :

0 = -4.9t^2 + 2.5t + 145

Solving this for t  produces.....

t = 5.7 s

I'd like to have some "Physics" person look at this.....I'm not sure which is correct  [ if either one is  !!!   ]

No prob, Solveit.....!!!!

Eh...it's no big deal.......we knew what you meant, anyway....!!!!

I believe that the helicopter's rate of ascent is irrelevant......at the time of release, the package is 145m above the ground instantaneously....so we have

145  = 4.9t^2     divide both sides by 4.9

145/4.9    = t^2      take the square root of both sides

t = about 5.44 s

Yeah......I see what you mean.....

Looking at your approach....you could  compute this as :

1  - [Probability that neither pass ]  =

1 - [ .7  *  .6]  =  1  - .42   = .58

Does that make sense ???

The exponent in guest's answer  was probably a mis-type.....it should be " -1 " rather than " - 11"