Sudoku-Class

Sudoku Class Puzzle Frame-by-Frame Solution

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(R3,C2) = 4 because of 4's in B3, B4, B7.

Frame 01 | End | Next

Frame 02 | Prev | Next

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(R2,C3) = 9 because of 9's in B3, B4, B7.

Frame 03 | Prev | Next

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5 4
6 6
7 8
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(R8,C7) = 2 because of 2's in B3, B6, B7.

Frame 04 | Prev | Next

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5 4
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7 8
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(R2,C5) = 4 because of 4's in B1, B3, B8.

Frame 05 | Prev | Next

1 3
5 4
6 6
7 8x
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(R2,C7) = 8 because C7 already has 1, 5, 7, which are an Exclusion.

Frame 06 | Prev | Next

1 3 5
5 4 6
6 6 7
7 9
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This leads to a sequence of finds, all for number 8 ...

(R1,C4) = 8 because of 8's in B1, B3, B5.

(R7,C6) = 8 because of 8's in B2, B5, B7, B9.

(R6,C9) = 8 because of 8's in B3, B9; and occupation in C9.

(R4,C2) = 8 because of 8's in B1, B5, B6, B7.

That completes the 8's within the entire puzzle.

It also leads to new what's left lists for R1 and C9.

Frame 07 | Prev | Next

1 3 5
5 4 6
6 6 7
7 9x
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Since B4 has a 9, and R8 has a 9, the 9 must go here...

(R7,C9) = 9 leaving only 5, 6, 7 in the C9 list.

Frame 08 | Prev | Next

1 3x 5
5 4 6
6 6 7
7
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Because 3 can't go in B6, and C7 is occupied in B3 ...

(R9,C7) = 3 the only place left for 3 in that column.

Frame 09 | Prev | Next

1 5
5 4x 6
6 6x 7
7
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That leaves us with 4, 6 in C7 (B6), and R6 has a 4 in B4 ...

(R5,C7) = 4 by isolation, and

(R6,C7) = 6 what's left. C7 is now complete.

(R6,C8) = 9 because of 9's in B3, B4, B5, B9.

Frame 10 | Prev | Next

1 5x
5 6
6 7
7
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Returning to the what's left list for R2, we see there are

only three empty cells scattered across the top boxes. C1

and C4 both already have 5's, so by exclusion there's only

one place left for a 5 in R2...

(R2,C9) = 5

Frame 11 | Prev | Next

1
5
6 6x
7 7x
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Now what's left in C9 is just 6 and 7 in empty cells of B3, B9.

But B9 already has a 7, so 7 is forced to B3, and 6 to B9...

(R3,C9) = 7

(R8,C9) = 6 and C9 is now complete.

Frame 12 | Prev | Next

1 1
5 3
6 6
7 7
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There are only two numbers missing from B9: 4, 5 and because

of the 4 in R7 and R8, they are forced to go in these cells...

(R9,C8) = 4

(R7,C8) = 5 (what's left in B9).

Frame 13 | Prev | Next

1 1 2 1
2 5 3 3
5 6 4 6
7 7 5 7
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|| | | || | | 8 || | 5 | 9 || 1 2 3 6
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|| | 6 | || | 9 | 7 || 3 | 4 | || 6 7 9
|| 8 | | 2 || 5 | | || | | 1 || x x x
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Things now fall into place very quickly....

(R9,C5) = 9 because of 9's in B2, B7, B9.

That leaves us with 6, 7 in R9, but 6 already appears in C6, so...

(R9,C6) = 7

(R9,C2) = 6 (what's left in R9).

Frame 14 | Prev | Next

1 1x 1 2 1
2 2 5 3 3
6 5 6 4 6
7 7 7 5 7
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|| 5 | | || | | 9 || 1 | | 4 ||
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|| | | 9 || | 4 | || 8 | | 5 || 1 7
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Both 2 and 6 must occur in R7 of B8 because they are blocked in R8

and R9 of both B7 and B9. That leaves 1 and 3 in R7 of B7, and 3

is already in C2, so...

(R7,C2) = 1

(R7,C1) = 3

(R8,C5) = 1 because of 1's in B5, B7, B9.

Frame 15 | Prev | Next

1 1 1 2 1
2 2 5x 2 3x 3
6 5 6 6 4 6
7x 7 7 7 5 7
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|| | 8 | || | | || | | ||
|| | | || 9 | | || 5 | | 3 ||
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| | | || 3 | | || 4 | | || 1 5 6 7
|| 9 | | || | 8 | || | | 2 ||
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| | | || | | || 6 | 9 | 8 || 2 5 7
|| 4 | | 3 || | | 1 || | | ||
||=====|=====|=====||=====|=====|=====||=====|=====|=====||
|| 3 | 1 | || | | 8 || | 5 | 9 || 2 6
|| | | 4 || | | || 7 | | ||
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| 7 | | 5 || | 1 | 3 || 2 | | 6 || 3 5 7
|| | 9 | || 4 | | || | 8 | || x x x
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| | 6 | || | 9 | 7 || 3 | 4 | ||
|| 8 | | 2 || 5 | | || | | 1 ||
||=====|=====|=====||=====|=====|=====||=====|=====|=====||

Since 5 and 7 both appear in B8, exclusion gives us....

(R8,C6) = 3

Only 5 and 7 are left in R8 (B7), and C1 already has a 5, so...

(R8,C1) = 7

(R8,C3) = 5 (what's left in R8).

(R5,C4) = 3 because of 3's in B4, B6, B8.

Frame 16 | Prev | Next

1x 1x 1
2 2 1 2 2 3
6 5 6 6 4x 6
7 7 7x 5 7
||=====|=====|=====||=====|=====|=====||=====|=====|=====||
|| | | || 8 | | || | | || 2 3 6 7
|| 5 | | || | | 9 || 1 | | 4 ||
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| 1 | | 9 || 7 | 4 | || 8 | | 5 || 1 7
|| | 3 | || | | 6 || | 2 | || x x
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| | 4 | || 1 | | || | | 7 || 2 3 5 6
|| | | 8 || | | || 9 | | ||
||=====|=====|=====||=====|=====|=====||=====|=====|=====||
|| | 8 | || | | 4 || | | || 1 2 6 7
|| | | || 9 | | || 5 | | 3 ||
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| | | || 3 | | || 4 | | || 1 5 6 7
|| 9 | | || | 8 | || | | 2 ||
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| | | || | | || 6 | 9 | 8 || 2 5 7
|| 4 | | 3 || | | 1 || | | ||
||=====|=====|=====||=====|=====|=====||=====|=====|=====||
|| 3 | 1 | || | | 8 || | 5 | 9 || 2 6
|| | | 4 || | | || 7 | | ||
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| 7 | | 5 || | 1 | 3 || 2 | | 6 ||
|| | 9 | || 4 | | || | 8 | ||
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| | 6 | || | 9 | 7 || 3 | 4 | ||
|| 8 | | 2 || 5 | | || | | 1 ||
||=====|=====|=====||=====|=====|=====||=====|=====|=====||

For a long time, we've ignore the what's left list for R2.

There's only 1 and 7 left, and C1 has been found to be 7, so...

(R2,C1) = 1 by exclusion of 7.

(R2,C4) = 7 (what's left in R2). R2 is now complete.

(R3,C4) = 1 because of 1's in B5, B8; and occupation in C4.

(R4,C6) = 4 because of 4's in B2, B6, B8.

Frame 17 | Prev | Next

1
2 2 1 2x 3 3
6 5x 6x 6x 5 2x 6
7 7 5x 7
||=====|=====|=====||=====|=====|=====||=====|=====|=====||
|| | | || 8 | | || | | || 2 3 6 7
|| 5 | | || | | 9 || 1 | | 4 ||
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| 1 | | 9 || 7 | 4 | || 8 | | 5 ||
|| | 3 | || | | 6 || | 2 | ||
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| | 4 | || 1 | | 2 || | | 7 || 2 3 5 6
|| | | 8 || | | || 9 | | || x
||=====|=====|=====||=====|=====|=====||=====|=====|=====||
|| | 8 | || | 6 | 4 || | | || 1 2 6 7
|| | | || 9 | | || 5 | | 3 || x
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| | | 6 || 3 | | 5 || 4 | | || 1 5 6 7
|| 9 | | || | 8 | || | | 2 || x x
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| | 5 | || 2 | 7 | || 6 | 9 | 8 || 2 5 7
|| 4 | | 3 || | | 1 || | | || x x x
||=====|=====|=====||=====|=====|=====||=====|=====|=====||
|| 3 | 1 | || 6 | 2 | 8 || | 5 | 9 || 2 6
|| | | 4 || | | || 7 | | || x x
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| 7 | | 5 || | 1 | 3 || 2 | | 6 ||
|| | 9 | || 4 | | || | 8 | ||
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| | 6 | || | 9 | 7 || 3 | 4 | ||
|| 8 | | 2 || 5 | | || | | 1 ||
||=====|=====|=====||=====|=====|=====||=====|=====|=====||

That leaves just 2, 5 in C6; and R5 already has a 2, so...

(R5,C6) = 5

(R3,C6) = 2 (what's left in C6).

(R6,C2) = 5 because of 5's in B5 and B6; and occupation in R6.

(R6,C4) = 2 because of 7 in C4 and what's left in R6.

(R6,C5) = 7 (what's left in R6).

(R4,C5) = 6 (what's left in B5).

(R5,C3) = 6 because of 6's in B5, B6, B7.

(R7,C4) = 6 (what's left in C4).

(R7,C5) = 2 (what's left in B8).

Frame 18 | Prev | Next

1x
2x 2x 1x 3 3
6x 7x 7x 5 6
7x
||=====|=====|=====||=====|=====|=====||=====|=====|=====||
|| | 2 | 7 || 8 | | || | | || 2 3 6 7
|| 5 | | || | | 9 || 1 | | 4 || x x
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| 1 | | 9 || 7 | 4 | || 8 | | 5 ||
|| | 3 | || | | 6 || | 2 | ||
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| 6 | 4 | || 1 | | 2 || | | 7 || 3 5 6
|| | | 8 || | | || 9 | | || x
||=====|=====|=====||=====|=====|=====||=====|=====|=====||
|| 2 | 8 | 1 || | 6 | 4 || | 7 | || 1 2 7
|| | | || 9 | | || 5 | | 3 || x x x
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| | 7 | 6 || 3 | | 5 || 4 | 1 | || 1 7
|| 9 | | || | 8 | || | | 2 || x x
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| | 5 | || 2 | 7 | || 6 | 9 | 8 ||
|| 4 | | 3 || | | 1 || | | ||
||=====|=====|=====||=====|=====|=====||=====|=====|=====||
|| 3 | 1 | || 6 | 2 | 8 || | 5 | 9 ||
|| | | 4 || | | || 7 | | ||
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| 7 | | 5 || | 1 | 3 || 2 | | 6 ||
|| | 9 | || 4 | | || | 8 | ||
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| | 6 | || | 9 | 7 || 3 | 4 | ||
|| 8 | | 2 || 5 | | || | | 1 ||
||=====|=====|=====||=====|=====|=====||=====|=====|=====||

In C2, all that's left are 2, 7; and R5 has already has 2, so...

(R5,C2) = 7 by exclusion of 2.

(R1,C2) = 2 (what's left in C2).

In C3, all that's left is 1, 7; and 1 is blocked in B1, so...

(R1,C3) = 7

(R4,C3) = 1

(R5,C8) = 1 (what's left in R5).

(R4,C8) = 7 (what's left in B6).

(R4,C1) = 2 (what's left in R4).

(R3,C1) = 6 (what's left in C1).

Frame 19 | Prev | First

3x 3x
5x 6x
||=====|=====|=====||=====|=====|=====||=====|=====|=====||
|| | 2 | 7 || 8 | 3 | || | 6 | || 3 6
|| 5 | | || | | 9 || 1 | | 4 || x x
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| 1 | | 9 || 7 | 4 | || 8 | | 5 ||
|| | 3 | || | | 6 || | 2 | ||
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| 6 | 4 | || 1 | 5 | 2 || | 3 | 7 || 3 5
|| | | 8 || | | || 9 | | || x x
||=====|=====|=====||=====|=====|=====||=====|=====|=====||
|| 2 | 8 | 1 || | 6 | 4 || | 7 | ||
|| | | || 9 | | || 5 | | 3 ||
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| | 7 | 6 || 3 | | 5 || 4 | 1 | ||
|| 9 | | || | 8 | || | | 2 ||
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| | 5 | || 2 | 7 | || 6 | 9 | 8 ||
|| 4 | | 3 || | | 1 || | | ||
||=====|=====|=====||=====|=====|=====||=====|=====|=====||
|| 3 | 1 | || 6 | 2 | 8 || | 5 | 9 ||
|| | | 4 || | | || 7 | | ||
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| 7 | | 5 || | 1 | 3 || 2 | | 6 ||
|| | 9 | || 4 | | || | 8 | ||
||-----|-----|-----||-----|-----|-----||-----|-----|-----||
|| | 6 | || | 9 | 7 || 3 | 4 | ||
|| 8 | | 2 || 5 | | || | | 1 ||
||=====|=====|=====||=====|=====|=====||=====|=====|=====||

The rest are simple to find ...

(R3,C5) = 5 by isolation.

(R1,C5) = 3 (what's left in B2).

(R1,C8) = 6 (what's left in R1).

(R3,C8) = 3 (what's left in B3).

The puzzle is solved!

Could numbers be found in a different order? Certainly, but it may not make much difference. You have to find numbers one at a time (or in pairs). Usually you find several numbers very early, then you find them very slowly, and then you find them rapidly again toward the end. That SLOW section in the middle is most frustrating. You look and look and look, and nothing seems to be found with absolute confidence. Then there's a break-through...you find something by Phantom or Exclusion, and then several numbers fall into place. If you're forced to guess (usually between two numbers in two empty cells), then the puzzle was badly designed. You should NEVER have to guess.

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