The best way that I have found to answer the "Leap Frog Test", would be to do the following:
1. Give each rock that a frog sits on a number. Count the numbers from left to right, using the numbers 1, 2, 3, 4, 5, 6, 7.
2. Then, you count the rocks so many numbers over;(using the numerical formula below), and click on the frog sitting on top of it.
3. Example: First rock you'll click on is: Rock# 3 (click on Frog)
Then click on: Rock# 5 (click on Frog )
Then on... # 6 (click on Frog )
etc., etc., etc... # 4 (click on Frog )
I found a logic approach more understandable and useable.
I figured out that the secret is to avoid making a hop (move one space) or a jump (leap over another frog) that will put 2 frogs of the same color next to each other unless they are on the 3 end rocks with no opposite color frog there. Also don't make a hop or a jump that will force you to put 2 like color frogs together on the next move. If you do get 2 frogs of the same color together outside the 3 end spots you're sunk and might as well just push REINICIAR to start over. Here is a set of moves that will work. Red is the move. Blue is the explanation. Notations: G=green frog, B=brown frog, 1=lead frog, 2=middle frog, 3=last frog J=jump, H=hop, ^=over.
1. G1-H This means the lead green frog hops to the next rock. The only other move is B1-H and that's an acceptable opening move also.
2. B1-J^G1 This means the lead brown frog jumps over the lead green frog. The only other moves are G2-H & G3-J^G2 but those would put frogs next to each other and that's a no-no.
3. B2-H A B3-J^B2 move would put B3 & B2 next to each other and you're stuck. A G1-H move would force either a B2-J^G1 or a G2-J^B1 move either of which puts 2 like colors together and you're stuck.
4. G1-J^B2 A B3-H move puts 2 browns together.
5. G2-J^B1 A B2-H move again puts 2 browns together.
6. G3-H A B1-H forces a G3 or a B2 jump either of which puts like colors together.
7. B1-J^G3 No other move is possible.
8. B2-J^G2 A G3-H puts 2 greens together.
9. B3-J^G1 A G2-H puts 2 greens together.
10. G1-H No other move is possible.
11. G2-J^B3 No other move is possible. This move does put 2 greens together but they are on the end rocks with no browns in the way.
12. G3-J^B2 A B3-H would put 2 browns together.
13. B2-H No other move is possible.
14. B3-J^G3 No other move is possible.
15. G1-H No other move is possible and this one successfully completes the game, VOILA!
Now try it on your own
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