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The '''Glitter Brooch''' by | The '''Glitter Brooch''' by ''Agent RO''. | ||
== First Bag == | == First Bag == | ||
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{{pfrow|G|G|G|O|O|G|G|G|G|G}} | {{pfrow|G|G|G|O|O|G|G|G|G|G}} | ||
{{pfrow|G|G|G|O|O|G|G|G|G|G}} | {{pfrow|G|G|G|O|O|G|G|G|G|G}} | ||
{{pfend}} | |||
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This way has an extra solution. | |||
{| | |||
|{{pfstart}} | |||
{{pfrow| | | | | | | | | | }} | |||
{{pfrow| | | | | |L|L|I|O|O}} | |||
{{pfrow|S|Z|Z|P|P|P|L|I|O|O}} | |||
{{pfrow|S|S|Z|Z|P|G|L|I|G|G}} | |||
{{pfrow|G|S| | | |G|G|I|G|G}} | |||
{{pfend}} | |||
|{{pfstart}} | |||
{{pfrow| | | | | | | | | | }} | |||
{{pfrow| | | | | | | | | | }} | |||
{{pfrow| | | | | | | | | | }} | |||
{{pfrow| | | | | |L|L|I|O|O}} | |||
{{pfrow|G|S| | | |G|G|I|G|G}} | |||
{{pfend}} | |||
|{{pfstart}} | |||
{{pfrow| | | | | | | | | | }} | |||
{{pfrow| | | | | | | | | | }} | |||
{{pfrow| | | | | | | | | | }} | |||
{{pfrow|J|j|j|O|O|G|G|G|G|G}} | |||
{{pfrow|G|G|j|O|O|G|G|G|G|G}} | |||
{{pfend}} | |||
|{{pfstart}} | |||
{{pfrow| | | | | | | | | | }} | |||
{{pfrow| | | | | | | | | | }} | |||
{{pfrow| | | | | | | | | | }} | |||
{{pfrow|I|I|I|I|L|G|G|G|G|G}} | |||
{{pfrow|G|G|L|L|L|G|G|G|G|G}} | |||
{{pfend}} | {{pfend}} | ||
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If either S comes | If either S comes before Z or Z comes before O, then the below is the stacking method. The Perfect Clear probability is unknown. | ||
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== Late O Piece == | == Late O Piece == | ||
An alternative is placing the O | An alternative is placing the O tetrimino after the T-Spin Double as in the diagrams below. | ||
{| | {| |
Revision as of 08:00, 28 April 2021
The Glitter Brooch by Agent RO.
First Bag
There are 3 requirements (from left to right): L before Z, I before S and J before O.
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Second Bag and later
Ideally, one should stack like this if S comes before Z then J, it can be made to a 6-line Perfect Clear after a T-Spin Double.
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This way has an extra solution.
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If the above is not feasible, one can go for 8 lines in one of these three stacking methods.
The first is the most ideal. It involves needing the S piece berfore the L piece. The Perfect Clear probability is 88.81 %.
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If one cannot make a Perfect Clear, they may still be able to make a Perfect Clear after 12 lines. Below is an example.
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If either S comes before Z or Z comes before O, then the below is the stacking method. The Perfect Clear probability is unknown.
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If one cannot make a Perfect Clear, they can make a T-Spin Double, in most cases, one of these 2 ways, and may also result in a 12-line Perfect Clear.
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If O comes before Z, then the third stacking method is as follows. The Perfect Clear probability is 40.71 %.
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If one cannot make a Perfect Clear, it can be followed by LST stacking. If they can, they may go for 12-line Perfect Clear.
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Late O Piece
An alternative is placing the O tetrimino after the T-Spin Double as in the diagrams below.
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It forms exactly the same shape as TKI 3 Flat Top. Some examples of continuations:
- 6-line Perfect Clear
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- 8-line Perfect Clear
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- Mechanical TSD
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