[309.—THE FORTY-NINE COUNTERS.—solution]
The counters may be arranged in this order:—
| A1, | B2, | C3, | D4, | E5, | F6, | G7. |
| F4, | G5, | A6, | B7, | C1, | D2, | E3. |
| D7, | E1, | F2, | G3, | A4, | B5, | C6. |
| B3, | C4, | D5, | E6, | F7, | G1, | A2. |
| G6, | A7, | B1, | C2, | D3, | E4, | F5. |
| E2, | F3, | G4, | A5, | B6, | C7, | D1. |
| C5, | D6, | E7, | F1, | G2, | A3, | B4. |
[310.—THE THREE SHEEP.—solution]
The number of different ways in which the three sheep may be placed so that every pen shall always be either occupied or in line with at least one sheep is forty-seven.
The following table, if used with the key in Diagram 1, will enable the reader to place them in all these ways:—
| Two Sheep. | Third Sheep. | No. of Ways. |
| A and B | C, E, G, K, L, N, or P | 7 |
| A and C | I, J, K, or O | 4 |
| A and D | M, N, or J | 3 |
| A and F | J, K, L, or P | 4 |
| A and G | H, J, K, N, O, or P | 6 |
| A and H | K, L, N, or O | 4 |
| A and O | K or L | 2 |
| B and C | N | 1 |
| B and E | F, H, K, or L | 4 |
| B and F | G, J, N, or O | 4 |
| B and G | K, L, or N | 3 |
| B and H | J or N | 2 |
| B and J | K or L | 2 |
| F and G | J | 1 |
| 47 |
This, of course, means that if you place sheep in the pens marked A and B, then there are seven different pens in which you may place the third sheep, giving seven different solutions. It was understood that reversals and reflections do not count as different.