How To Solve Second Six Levels Of River Crossing IQ Game

The River Crossing IQ game is just fun. Need help to solve the levels? Here is another.

Know how to solve the next six levels as I had posted for solving the first six levels of the River Crossing IQ Game. Below are the next six levels of River Crossing IQ Game, which may differ from your version of the game.

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This post contains another six levels of the River Crossing IQ Game. Have fun solving it.

There are 6 frogs and 7 pillars

There are 6 frogs and 7 pillars

There are 6 frogs and 7 pillars

Logic 7: There are 6 frogs and 7 pillars, swap these 6 frogs into two groups of 3, provided that frogs can not jump back, and the longest distance they can jump is 2 pillars.
Solution: Name the frogs on the left side L1, L2, and L3 the same as the frogs on the right side R1, R2, and R3.

Steps
L3
R1
R2
L3
L2
L1
R1
R2
R3
L3
L2
L1
R2
R3
L1

There are 3 cups of 8L, 5L, 3L

There are 3 cups of 8L, 5L, 3L

There are 3 cups of 8L, 5L, 3L

Logic 8: There are 3 cups of 8L, 5L, 3L. The cup of 8L was filled with beer. Pour out 4L of beer within 10 times of pouring.
Solution:

Steps
8L to5L
5L to 3L
3L to 8L
5L to 3L
8L to 5L
5L to 3L

Aside from the river there are 1 police, 1 robber, 1 blond hair woman, and 2 children

Aside the river there are 1 police, 1 robber, 1 blond hair woman and 2 children

Aside from the river, there are 1 police, 1 robber, 1 blond hair woman, and 2 children

Logic 9: Aside from the river there are 1 police, 1 robber, 1 blond hair woman and 2 children, 1 red hair woman, and 2 children. There is a boat carrying a maximum of 2 people. Only adults can sail but not kids. Please help all people move across the river, knowing that if the policeman is absent, the robber will kill all the people there. If the blond-haired woman is absent, the red-haired woman will beat the blond-haired woman’s children (and vice versa).
Solution:
Let the left island = A and the right island = B
Blond hair woman and her children be BW, B1 and B2
Red hair woman and her children be RW, R1 and R2

Steps
First pick policeman and robber to A. Drop the robber and policeman back to B.
Policeman sail with B1 to A and back with the robber to B.
Now BW and B2 sail and drop B2 to A, BW back to B.
Now women sail to A, BW stays and RW back to B.
Policeman and robber sails to A, they two stay on A and BW sails to B.
Women sail to A, BW stays and RW go back to B.
Now RW sails with R1 to A. Both stay and the policeman with the robber goes back to B.
The robber stays, the policeman with R2 sail to A.
Policeman goes back to B and sails with the robber to A.

Move all of these rings to the destination pillar after 33 moves

Move all of these rings to the destination pillar after 33 moves

Move all of these rings to the destination pillar after 33 moves

Logic 10: Please move all of these rings to the destination pillar after 33 moves. Knowing that in the process of moving, the large ring can not be located on the smaller ring.
Solution: Name pillars from left to right P1, P2 and P3. Rings from smaller to larger R1, R2, R3, R4 and R5.

Steps
R1 to P3
R2 to P2
R1 to P2
R3 to P3
R1 to P1
R2 to P3
R1 to P3
R4 to P2
R1 to P2
R2 to P1
R1 to P1
R3 to P2
R1 to P3
R2 to P2
R1 to P2
R5 to P3
R1 to P1
R2 to P3
R1 to P3
R3 to P1
R1 to P2
R2 to P1
R1 to P1
R4 to P3
R1 to P3
R2 to P2
R1 to P2
R3 to P3
R1 to P1
R2 to P3
R1 to P3

Help 3 men with 3 correlative money bags move to the other side of the river

Help 3 men with 3 correlative money bags move to the other side of the river

Help 3 men with 3 correlative money bags move to the other side of the river

Logic 11: Help 3 men with 3 correlative money bags move to the other side of the river. Note: If at any side of the river, the total amount of money in the bags is greater than the total value of money owned by these men there, the men would steal the money and escape.
Solution: Let red man = RM, blue man = BM and yellow man = YM. Red bag = RB, blue bag = BB and yellow bag = YB.
Left island = A and right island = B.

Steps
YM with YB to A. YM back to B.
RM with BB to A, drop bag and back to B.
YM and BM sail to A.
YM with YB sail to B and stay with the bag.
RM with RB sail to A and stay with bag.
BM with BB go to B and drop bag.
BM and YM sail to A, both stay and RM go to B.
RM picks YB from B and stays at A.
BM takes BB from B and sails to A.

Switch places of the 2 black and yellow seahorses

Switch places of the 2 black and yellow seahorses

Switch places of the 2 black and yellow seahorses

Logic 12: Please switch places of the 2 black and yellow seahorses, knowing that the seahorses move like a knight on a chessboard.
Solution: Let yellow seahorses be y1 and y2. Black seahorses are B1 and B2.
Now we name the places from top left to bottom right 1, 2, 3, 4, 5, 6, 7, 8, and 9.
Steps
y2 to 6.
B2 to 2.
B1 to 4.
Y1 to 8.
Y2 to 1.
B2 to 7.
B1 to 9.
Y1 to 3.
Y2 to 8.
B2 to 6.
B1 to 2.
Y1 to 4.
Y2 to 3.
B2 to 1.
B1 to 7.
Y1 to 9.

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