A covering design C(v,k,t,m,=b) is a pair (V,B), where V is a set of v elements (called points) and B is a collection of b k-subsets of V (called blocks), such that every m-subset of V intersects in at least one member of B in at least t points.
When applied to lottery, in form of an abbreviated wheel:
  • v: total numbers in the design; amount of numbers you choose to play the wheel
  • k: size of a block or bet
  • t: minimum guarantee
  • m: amount of numbers that must be guessed correctly in the draw
  • b: number of blocks or bets or tickets
Wheel C(8,6,3,3,=4) describes the wheel with 8 chosen numbers designed for a Pick 6 lottery. The wheel guarantees at least one prize of 3 matches if 3 officially drawn numbers are within the group of 8 chosen numbers. Finally, the number of bets generated is 4, reduced from a total of 28.00 possible combinations of 8 taken 6 at a time. The coefficient of reduction is 07.00.

Wheel Summary
Abbreviated Wheel • Pick 6
8 Numbers
4 Tickets
3 if 3 Guarantee
Odds of guessing 3 Numbers
1 in 09.91
Balanced Wheel
NumbersOccurrences
01  02  03  04  05
06  07  08
3

Select the Numbers Guessed: Total combinations: 56
Odds of guessing 3 Numbers: 1 in 09.91
Possible Matches

3210
Hits
Odds
130032 1 in 17.34
211024 1 in 23.12
1
Page sizePage1of1

Block NumberIndexes
Block 1
  • 01
  • 02
  • 03
  • 04
  • 05
  • 07
Block 2
  • 01
  • 02
  • 03
  • 04
  • 06
  • 08
Block 3
  • 01
  • 04
  • 05
  • 06
  • 07
  • 08
Block 4
  • 02
  • 03
  • 05
  • 06
  • 07
  • 08