Missing numbers /blogentry/193328 tokecap's Blog: Missing numbers en-us Lottery Post RSS Generator Comment #5 /blogentry/193328#c278770 /blogentry/193328#c278770 Tue, 15 Jul 2025 21:47:40 GMT tokecap 214......2xx<br /><br />CO<br />062.....xx2<br /><br />ID<br />823.....82x<br /><br />NC<br />284.....28x

]]> tokecap Comment #4 /blogentry/193328#c278759 /blogentry/193328#c278759 Tue, 15 Jul 2025 19:14:16 GMT tokecap 242......2x2<br />6483.....xx8x<br /><br />Connecticut<br />188......x88<br />6995.....xxx5<br /><br />Delaware<br />746......Repeating Digits (Hot): 4, 7<br />7268.....x2x8<br /><br />Florida<br />586......58x<br />3925.....xx25<br /><br />Illinois<br />526......52x<br />1403.....Repeating Digits (Hot): 0, 1, 3, 4<br /><br />Indiana<br />690......Repeating Digits (Hot): 0, 9<br />4731.....Repeating Digits (Hot): 1, 3, 4, 7<br /><br />Iowa<br />795......xx5<br />1785.....xx85<br /><br />Kansas<b... [ More ]

]]> tokecap Comment #3 /blogentry/193328#c278745 /blogentry/193328#c278745 Tue, 15 Jul 2025 17:20:21 GMT tokecap 728 - Pattern: x28<br />4048 - Pattern: xx8 + Pattern:The hot/repeating digits (0,4)<br /><br />MI<br />284 - Pattern: 28x<br />7743- Pattern: The hot/repeating digits (0,3,4,7

]]> tokecap Comment #2 /blogentry/193328#c278744 /blogentry/193328#c278744 Tue, 15 Jul 2025 16:56:33 GMT tokecap 035 - Pattern: xx5<br />5224- Pattern: 522x<br /><br />MD<br />707 - The hot/repeating digits (0,7)<br />3400 - The hot/repeating digits (0,3,4

]]> tokecap Comment #1 /blogentry/193328#c278743 /blogentry/193328#c278743 Tue, 15 Jul 2025 16:50:25 GMT tokecap Pattern: x2x (2 in the second position)<br />Pattern: 2xx (2 in the first position)<br /><br />Pattern: xx5 (5 in the third position)<br />Pattern: x5x (5 in the second position)<br />Pattern: 5xx (5 in the first position)<br /><br />Pattern: xx8 (8 in the third position)<br />Pattern: x8x (8 in the second position)<br />Pattern: 8xx (8 in the first position

]]> tokecap Original Blog Entry: Missing numbers /blogentry/193328 /blogentry/193328 Tue, 15 Jul 2025 16:14:27 GMT tokecap Morning Draw Results:

Tennessee (TN)

Pick 3: 716

Pick 4: 4703

Texas (TX)

Pick 3: 173

Pick 4: 7907

Repeating Digit String:

11334677777900

From this string, the digits that appear more than once are:

1, 3, 4, 7, 9, 0 (all repeating)

6 appears only once

2, 5, 8 are missing

So we have:

Repeating Digits (Hot): 0, 1, 3, 4, 7, 9

Single Occurrence (Mild): 6

Missing Digits (Cold): 2, 5, 8

Analysis of Draws:

Digits in the draws:

Pick 3: 716, 173 digits: 1, 3, 6, 7

Pick 4: 4703, 7907 digits: 0, 3, 4, 7, 9

Total digits from all draws:

7, 1, 6, 4, 7, 0, 1, 7, 3, 9, 0, 7

= Unique digits: 0, 1, 3, 4, 6, 7, 9

Repeating (Hot) Digits Hit in Draws:

0 (in 4703, 7907)

1 (in 716, 173)

3 (in 4703, 173)

4 (in 4703)

7 (in all)

9 (in 7907)

All hot digits appeared!

Missing (Cold) Digits:

2, 5, 8 are still missing

Summary:

The hot/repeating digits (0,1,3,4,7,9) are strongly represented in the morning draws.

The cold digits (2,5,8) are completely absent in these results.

Digit 6 (mild/appears once) showed up in 716.

Let s calculate the probability that all 3 missing digits (2, 5, 8)

will appear in Pick 3 and Pick 4 draws across all states.

Definitions

Pick 3: 3-digit numbers each digit is drawn independently from 0 9.

Pick 4: 4-digit numbers each digit is drawn independently from 0 9.

Goal: At least one of 2, 5, 8 appears in the result.

Assumption: We're calculating per draw probability and then estimating

for many draws across all states.

Step-by-Step

1. Probability a single digit is not 2, 5, or 8:

There are 10 digits (0 9). The non-2/5/8 digits are: 0, 1, 3, 4, 6, 7, 9 7 digits.

So:

Probability a single digit is NOT 2/5/8 = 7/10 = 0.7

Probability a single digit IS 2/5/8 = 3/10 = 0.3

2. Probability in a single Pick 3 draw:

We want the chance that at least one of 2, 5, or 8 appears.

Complementary Probability:

P(None of the digits are 2/5/8) =

0.7

3

=

0.343

0.7

3

=0.343

So, P(At least one digit is 2/5/8) =

1

0.343

=

0.657

1 0.343=0.657 or 65.7%

3. Probability in a single Pick 4 draw:

P(None of the digits are 2/5/8) =

0.7

4

=

0.2401

0.7

4

=0.2401

So, P(At least one digit is 2/5/8) =

1

0.2401

=

0.7599

1 0.2401=0.7599 or 75.99%

4. For one state s Pick 3 and Pick 4, combined:

Pick 3: ~65.7%

Pick 4: ~76%

Assume independence:

P(2/5/8 appear in either Pick 3 or Pick 4)

=

1

(

1

0.657

)

(

1

0.76

)

1 (1 0.657) (1 0.76)

=

1

(

0.343

0.24

)

=

1

0.0823

=

0.9177

1 (0.343 0.24)=1 0.0823=0.9177

91.77% chance that at least one of 2, 5, or 8 appears in either

Pick 3 or Pick 4 for a single state.

5. Across all 50 states (approximation):

Let s estimate the probability that at least one of the missing digits

appears somewhere in all state results.

Let s assume 40 states have Pick 3 and/or Pick 4 draws daily.

P(No 2, 5, or 8 in one state) = 1 - 0.9177 = 0.0823

P(No 2, 5, or 8 in any of 40 states) =

0.0823

40

4.1

10

40

0.0823

40

4.1 10

40

Virtually 100% probability that 2, 5, or 8 will appear somewhere

in the Pick 3 or Pick 4 draws across all states.

Conclusion:

Level Probability that 2, 5, or 8 appears

Single Pick 3 65.7%

Single Pick 4 76%

One state's Pick 3 or 4 91.77%

All states Pick 3 4 ~100%

In all state draws, it is almost certain that at least one of

the missing digits 2, 5, or 8 will appear.... [ More ]

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