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| __NOTOC__
| | #REDIRECT [[Tetromino#Orientation]] |
| A [[tetromino]]es orientation, with regards to ''Tetris'' refers to the different ways that tetromino can exist after [[rotate|rotations]].
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| Normally all the tetrominoes have a total of nineteen orientations, but possibly to make things more symmetric, [[Tetris Guideline|newer games]] add three orientations: one for ''S'', ''Z'', and ''I''.
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| {|
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| |{{pfstart}}
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| {{pfrow | | | | | | | | | | }}
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| {{pfrow | | | | |o|o| | | | }}
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| {{pfrow | | | | |o|o| | | | }}
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| {{pfrow | | | | |o|o| | | | }}
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| {{pfrow | | | | |o|o| | | | }}
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| {{pfrow | | | | |o|o| | | | }}
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| {{pfrow | | | | |o|o| | | | }}
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| |}
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| {|
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| |- valign="top"
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| |{{pfstart}}
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| {{pfrow | | | | | | | | | | }}
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| {{pfrow | | | |i|i|i|i| | | }}
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| {{pfrow | | | | | |i| | | | }}
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| {{pfrow | | | | | |i| | | | }}
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| {{pfrow | | | | | |i| | | | }}
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| {{pfrow | | | | | |i| | | | }}
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| {{pfrow | | | |i|i|i|i| | | }}
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| |{{pfstart}}
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| {{pfrow | | | | |i| | | | | }}
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| {{pfrow | | | | |i| | | | | }}
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| |}
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| {|
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| |- valign="top"
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| |{{pfstart}}
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| {{pfrow | | | | |t| | | | | }}
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| {{pfrow | | | |t|t|t| | | | }}
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| {{pfend}}
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| {{pfrow | | | | |t| | | | | }}
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| {{pfrow | | | | |t|t| | | | }}
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| {{pfrow | | | | |t| | | | | }}
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| {{pfrow | | | |t|t|t| | | | }}
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| {{pfrow | | | | |t| | | | | }}
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| {{pfend}}
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| |{{pfstart}}
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| {{pfrow | | | | |t| | | | | }}
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| {{pfrow | | | |t|t| | | | | }}
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| {{pfrow | | | | |t| | | | | }}
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| {{pfend}}
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| |}
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| {|
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| |- valign="top"
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| |{{pfstart}}
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| {{pfrow | | | | |s|s| | | | }}
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| {{pfrow | | | |s|s| | | | | }}
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| {{pfrow | | | | | | | | | | }}
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| {{pfrow | | | | | | | | | | }}
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| {{pfend}}
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| |{{pfstart}}
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| {{pfrow | | | | | | | | | | }}
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| {{pfrow | | | | | | | | | | }}
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| {{pfend}}
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| |{{pfstart}}
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| {{pfrow | | | | | | | | | | }}
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| {{pfrow | | | | |s|s| | | | }}
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| {{pfrow | | | |s|s| | | | | }}
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| {{pfrow | | | | | | | | | | }}
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| {{pfend}}
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| |{{pfstart}}
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| {{pfrow | | | | | | | | | | }}
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| {{pfrow | | | | | | | | | | }}
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| {{pfrow | | | | | | | | | | }}
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| {{pfrow | | | | | | | | | | }}
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| {{pfend}}
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| |}
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| {|
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| |- valign="top"
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| |{{pfstart}}
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| {{pfrow | | | |z|z| | | | | }}
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| {{pfrow | | | | |z|z| | | | }}
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| {{pfrow | | | | | | | | | | }}
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| {{pfrow | | | | | | | | | | }}
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| {{pfend}}
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| |{{pfstart}}
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| {{pfrow | | | | | | | | | | }}
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| {{pfrow | | | | | | | | | | }}
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| {{pfrow | | | | | | | | | | }}
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| |{{pfstart}}
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| {{pfrow | | | | | | | | | | }}
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| {{pfrow | | | |z|z| | | | | }}
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| {{pfrow | | | | |z|z| | | | }}
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| {{pfend}}
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| |{{pfstart}}
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| {{pfrow | | | | | | | | | | }}
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| {{pfrow | | | | | | | | | | }}
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| {{pfrow | | | | | | | | | | }}
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| {{pfend}}
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| |}
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| {|
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| |- valign="top"
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| |{{pfstart}}
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| {{pfrow | | | |j| | | | | | }}
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| {{pfrow | | | |j|j|j| | | | }}
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| {{pfrow | | | | | | | | | | }}
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| |{{pfstart}}
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| {{pfrow | | | | |j| | | | | }}
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| {{pfrow | | | | |j| | | | | }}
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| {{pfrow | | | |j|j| | | | | }}
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| {{pfrow | | | | | | | | | | }}
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| {{pfend}}
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| |{{pfstart}}
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| {{pfrow | | | | | | | | | | }}
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| {{pfrow | | | |j|j|j| | | | }}
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| {{pfrow | | | | | |j| | | | }}
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| {{pfrow | | | | | | | | | | }}
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| {{pfend}}
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| |{{pfstart}}
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| {{pfrow | | | | |j|j| | | | }}
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| {{pfrow | | | | |j| | | | | }}
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| {{pfrow | | | | |j| | | | | }}
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| {{pfrow | | | | | | | | | | }}
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| {{pfend}}
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| |}
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| {|
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| |- valign="top"
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| |{{pfstart}}
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| {{pfrow | | | | | |l| | | | }}
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| {{pfrow | | | |l|l|l| | | | }}
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| {{pfrow | | | | | | | | | | }}
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| {{pfrow | | | | | | | | | | }}
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| {{pfend}}
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| |{{pfstart}}
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| {{pfrow | | | |l|l| | | | | }}
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| {{pfrow | | | | |l| | | | | }}
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| {{pfrow | | | | |l| | | | | }}
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| {{pfend}}
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| |{{pfstart}}
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| {{pfrow | | | | | | | | | | }}
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| {{pfrow | | | |l|l|l| | | | }}
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| {{pfrow | | | |l| | | | | | }}
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| {{pfrow | | | | | | | | | | }}
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| {{pfend}}
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| |{{pfstart}}
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| {{pfrow | | | | |l| | | | | }}
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| {{pfrow | | | | |l| | | | | }}
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| {{pfrow | | | | |l|l| | | | }}
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| {{pfrow | | | | | | | | | | }}
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| {{pfend}}
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| |}
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