Table 1. The probabilities two equal players A and B win a tiebreak set in an even and odd number of games when there is a probabilistic advantage D in being ahead in scores.
| PA |
.50 |
.55 |
.60 |
.65 |
.70 |
.75 |
.80 |
| PB |
.50 |
.55 |
.60 |
.65 |
.70 |
.75 |
.80 |
| D |
.10 |
.10 |
.10 |
.10 |
.10 |
.10 |
.10 |
| P(A wins even) |
.2770 |
.2642 |
.2499 |
.2342 |
.2175 |
.2001 |
.1826 |
| P(A wins odd) |
.2230 |
.2438 |
.2665 |
.2913 |
.3187 |
.3490 |
.3832 |
| P(A wins) |
.5000 |
.5080 |
.5164 |
.5256 |
.5362 |
.5491 |
.5658 |
| P(B wins even) |
.2770 |
.2882 |
.2976 |
.3052 |
.3103 |
.3122 |
.3089 |
| P(B wins odd) |
.2230 |
.2038 |
.1860 |
.1693 |
.1535 |
.1387 |
.1253 |
| P(B wins) |
.5000 |
.4920 |
.4836 |
.4744 |
.4638 |
.4509 |
.4342 |
