It took a surviving ship to bring back the news--a ship in which, by sheer chance, a telepath had a light beam ready, turning it out at the innocent dust so that, within the panorama of his mind, the Dragon dissolved into nothing at all and the other passengers, themselves non-telepathic, went about their way not realizing that their own immediate deaths had been averted. From then on, it was easy--almost. * * * * * Planoforming ships always carried telepaths. Telepaths had their sensitiveness enlarged to an immense range by the pin-sets, which were telepathic amplifiers adapted to the mammal mind. The pin-sets in turn were electronically geared into small dirigible light bombs. Light did it. Light broke up the Dragons, allowed the ships to reform three-dimensionally, skip, skip, skip, as they moved from star to star. The odds suddenly moved down from a hundred to one against mankind to sixty to forty in mankind s favor. This was not enough. The telepaths were trained to become ultrasensitive, trained to become aware of the Dragons in less than a millisecond.
+-----+-----+-----+ | A | B | C | +-----+-----+-----+ | -7 | +88 | +19 | +-----+-----+-----+ | -95 | +95 | +26 | | -26 | +69 | -69 | +-----+-----+-----+ |-121 |+164 | -43 | +-----+-----+-----+ The same method may be used when four play; but some prefer to call the lowest score zero, and so make all the others plus. Suppose the final scores were as follows: ------+------+------+------------ A | B | C | D ------+------+------+------------ +186 | +42 | +344 | +116 ------+------+------+------------ +144 | 0 | +302 | +74 = 520 +4 | 4 | 4 | 4 ------+------+------+------------ +576 | 0 |+1208 | +296 -520 | -520 | -520 | -520 ------+------+------+------------ +56 | -520 | +688 | -224 ------+------+------+------------ If B is zero, his points are to be taken from those of each of the others, as B is plus. If the low score is a minus, the points must be added to each of the others. The three totals are added, and found, in this case, to be 520, which is the total of B’s loss. We now multiply the scores by the number of players engaged, in this case four, and from the product we deduct the 520 already found. Then the scores balance. When Skat is played for the League stake, which is one-fourth of a cent a point, the results may be found in a still shorter way by adding up all the scores and taking an average, this average being the sum divided by the number of players. Take the results just given for example:-- ------+------+------+--------------------- A | B | C | D ------+------+------+--------------------- 186 | 42 | 344 | 116 = 688 ÷ 4 = 172 172 | 172 | 172 | 172 ------+------+------+--------------------- +14 | -130 | +172 | -56 ------+------+------+--------------------- The average is simply deducted from each score, and the remainder is the amount won or lost, in cents. _=CHEATING.=_ As in all games in which the cards are dealt in groups, the greek will find many opportunities in Skat.
SHUFFLE BOARD. Shuffle Board is played on a table 30 feet long and 20 inches wide, with a gutter running all round it. The board is sprinkled with very fine sand. Four weights are used by each side, marked A and B to distinguish them. These weights are of iron or brass, 2½ inches in diameter, and ½ inch thick. Five inches from each end of the board and parallel with it is the deuce line. The object of the game is to push the weights from one end of the board to the other, each side playing one weight alternately until all four weights on each side are played. All pieces over the deuce line count 2, but if a piece hangs over the end of the board it is a _=ship=_, and counts 3. If there are no ships or deuces, the weight lying nearest to the deuce line counts one point. Only one ship or deuce can be counted in each round, so that only one side can score.