two
knights can always be placed, irrespective of attack or not, in 1/2(n^{4}
- n squared) ways. The following formulae will show in how many of these ways
the two pieces may be placed with attack and without:--
With Attack. Without Attack.
2 Queens 5n cubed - 6n squared + n 3n^{4} - 10n cubed + 9n squared - 2n
------------------- ------------------------------
3 6
2 Rooks n cubed - n squared n^{4} - 2n cubed + n squared
----------------------
2
2 Bishops 4n cubed - 6n squared + 2n 3n^{4} - 4n cubed + 3n squared - 2n
-------------------- -----------------------------
6 6
2 Knights 4n squared - 12n + 8 n^{4} - 9n squared + 24n
--------------------
2
(See No. 318, " Lion Hunting.")
DYNAMICAL CHESS PUZZLES.
"Push on--keep moving."
THOS. MORTON: _Cure for the Heartache_.
320.--THE ROOK'S TOUR.
[Illustration:
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+---+---+---+---+---+---+---+---+
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+---+---+---+---+---+---+---+---+
| | | | R | | | | |
+---+---+---+---+---+---+---+---+
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+---+---+---+---+---+---+---+---+
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+---+---+---+---+---+---+---+---+
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]
The puzzle is to move the single rook over the whole board, so that it
shall visit every square of the board once, and only once, and end its
tour on the square from which it starts. You have to do this in as few
moves as possible, and unless you are very careful you will take just
one move too many. Of course, a square is regarded equally as "visited"
whether you merely pass over it or make it a stopping-place, and we will
not quibble over the point whether the original square is actually
visited twice. We will ass
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