Jstris/Pentomino Wall Kick Illustration: Difference between revisions
From Hard Drop Tetris Wiki
(WIP: Visualized pentomino kicks - I, V and T done) |
(Add U pentomino kicks, add placeholders for remaining kicks) |
||
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== Pentomino Wall Kick Illustration == | |||
Please note that the pentomino naming used here follows the Golomb convention, extended with mirrored chiral pentomino names as seen in Wikipedia. | |||
=== I pentomino kicks === | |||
{| border=1 cellspacing=0 style="text-align:center;" | {| border=1 cellspacing=0 style="text-align:center;" | ||
|- | |- | ||
Line 280: | Line 274: | ||
{{pfend}} | {{pfend}} | ||
|} | |} | ||
{| border=1 cellspacing=0 style="text-align:center;" | {| border=1 cellspacing=0 style="text-align:center;" | ||
|- | |- | ||
Line 551: | Line 543: | ||
{{pfend}} | {{pfend}} | ||
|} | |} | ||
=== V pentomino kicks === | |||
{| border=1 cellspacing=0 style="text-align:center;" | {| border=1 cellspacing=0 style="text-align:center;" | ||
|- | |- | ||
Line 821: | Line 809: | ||
| | | | ||
|} | |} | ||
=== T pentomino kicks === | |||
{| border=1 cellspacing=0 style="text-align:center;" | {| border=1 cellspacing=0 style="text-align:center;" | ||
|- | |- | ||
Line 1,090: | Line 1,075: | ||
| | | | ||
|} | |} | ||
=== U pentomino kicks === | |||
{| | |||
| | {| border=1 cellspacing=0 style="text-align:center;" | ||
| | |- | ||
| | ! width=45 | | ||
|- | ! bgcolor=#8AF colspan=5 | Kick Tests | ||
| | |- align=center | ||
|} | ! bgcolor=#8AF | 0⇒R | ||
| width=100 |( 0, 0) | |||
{| | {{pfstart}} | ||
| | {{mrow7| | | | | | | }} | ||
|- | {{mrow7| | | | | | | }} | ||
| | {{mrow7| | | Z| G|-Z| | }} | ||
|- | {{mrow7| | | Z|-Z| Z| | }} | ||
| | {{mrow7| | | | G| G| | }} | ||
|} | {{mrow7| | | | | | | }} | ||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| width=100 | (-1, 0) | |||
{| | {{pfstart}} | ||
| | {{mrow7| | | | | | | }} | ||
| | {{mrow7| | | | | | | }} | ||
| | {{mrow7| | |-Z| G| Z| | }} | ||
| | {{mrow7| | |-Z| Z| Z| | }} | ||
| | {{mrow7| | | G| G| | | }} | ||
|} | {{mrow7| | | | | | | }} | ||
{{mrow7| | | | | | | }} | |||
{| | {{pfend}} | ||
| width=100 | (-1,+1) | |||
| | {{pfstart}} | ||
| | {{mrow7| | | | | | | }} | ||
| | {{mrow7| | | G| G| | | }} | ||
| | {{mrow7| | |-Z| | Z| | }} | ||
|} | {{mrow7| | |-Z|-Z| Z| | }} | ||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
| | {{mrow7| | | | | | | }} | ||
| | {{pfend}} | ||
| | | width=100 | ( 0,-2) | ||
| | {{pfstart}} | ||
| | {{mrow7| | | | | | | }} | ||
|} | {{mrow7| | | | | | | }} | ||
{{mrow7| | | Z| | Z| | }} | |||
{| | {{mrow7| | | Z| Z| Z| | }} | ||
{{mrow7| | | | G| G| | }} | |||
| | {{mrow7| | | | G| | | }} | ||
| | {{mrow7| | | | G| G| | }} | ||
| | {{pfend}} | ||
| | | width=100 | (-1,-2) | ||
|} | {{pfstart}} | ||
{{mrow7| | | | | | | }} | |||
{| | {{mrow7| | | | | | | }} | ||
| | {{mrow7| | | Z| | Z| | }} | ||
| | {{mrow7| | | Z| Z| Z| | }} | ||
| | {{mrow7| | | G| G| | | }} | ||
|- | {{mrow7| | | G| | | | }} | ||
| | {{mrow7| | | G| G| | | }} | ||
|} | {{pfend}} | ||
|- align=center | |||
{| | ! bgcolor=#8AF | R⇒2 | ||
| | | ( 0, 0) | ||
| | {{pfstart}} | ||
| | {{mrow7| | | | | | | }} | ||
| | {{mrow7| | | | | | | }} | ||
| | {{mrow7| | | | Z| Z| | }} | ||
|} | {{mrow7| | | G|-Z| G| | }} | ||
{{mrow7| | | G| Z|-Z| | }} | |||
{| | {{mrow7| | | | | | | }} | ||
| | {{mrow7| | | | | | | }} | ||
| | {{pfend}} | ||
| | | (+1, 0) | ||
| | {{pfstart}} | ||
| | {{mrow7| | | | | | | }} | ||
|} | {{mrow7| | | | | | | }} | ||
{{mrow7| | | | Z| Z| | }} | |||
{{mrow7| | | |-Z| G| G| }} | |||
| | {{mrow7| | | |-Z| Z| G| }} | ||
| | {{mrow7| | | | | | | }} | ||
| | {{mrow7| | | | | | | }} | ||
| | {{pfend}} | ||
| | | (+1,-1) | ||
|} | {{pfstart}} | ||
{{mrow7| | | | | | | }} | |||
{| | {{mrow7| | | | | | | }} | ||
| | {{mrow7| | | | Z| Z| | }} | ||
|- | {{mrow7| | | | Z| | | }} | ||
| | {{mrow7| | | |-Z|-Z| G| }} | ||
| | {{mrow7| | | | G| | G| }} | ||
| | {{mrow7| | | | | | | }} | ||
|} | {{pfend}} | ||
| ( 0,+2) | |||
{| | {{pfstart}} | ||
| | {{mrow7| | | | | | | }} | ||
| | {{mrow7| | | G| G| G| | }} | ||
| | {{mrow7| | | G| Z|-Z| | }} | ||
| | {{mrow7| | | | Z| | | }} | ||
| | {{mrow7| | | | Z| Z| | }} | ||
|} | {{mrow7| | | | | | | }} | ||
{{mrow7| | | | | | | }} | |||
{| | {{pfend}} | ||
| (+1,+2) | |||
| | {{pfstart}} | ||
| | {{mrow7| | | | | | | }} | ||
| | {{mrow7| | | | G| G| G| }} | ||
| | {{mrow7| | | |-Z| Z| G| }} | ||
|} | {{mrow7| | | | Z| | | }} | ||
{{mrow7| | | | Z| Z| | }} | |||
{| | {{mrow7| | | | | | | }} | ||
| | {{mrow7| | | | | | | }} | ||
| | {{pfend}} | ||
| | |- align=center | ||
| | ! bgcolor=#8AF | 2⇒L | ||
| | | ( 0, 0) | ||
|} | {{pfstart}} | ||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | G| G| | | }} | |||
{{mrow7| | | Z|-Z| Z| | }} | |||
{{mrow7| | |-Z| G| Z| | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | G| G| | }} | |||
{{mrow7| | | Z| Z|-Z| | }} | |||
{{mrow7| | | Z| G|-Z| | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1,+1) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | G| G| | }} | |||
{{mrow7| | | | | G| | }} | |||
{{mrow7| | | Z|-Z|-Z| | }} | |||
{{mrow7| | | Z| | Z| | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| ( 0,-2) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | Z| Z| Z| | }} | |||
{{mrow7| | |-Z| G| Z| | }} | |||
{{mrow7| | | | G| | | }} | |||
{{mrow7| | | G| G| | | }} | |||
{{pfend}} | |||
| (+1,-2) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | Z| Z| Z| | }} | |||
{{mrow7| | | Z| G|-Z| | }} | |||
{{mrow7| | | | | G| | }} | |||
{{mrow7| | | | G| G| | }} | |||
{{pfend}} | |||
|- align=center | |||
! bgcolor=#8AF | L⇒0 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | |-Z| Z| G| | }} | |||
{{mrow7| | | G|-Z| G| | }} | |||
{{mrow7| | | Z| Z| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (-1, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | G| Z|-Z| | | }} | |||
{{mrow7| | G| G|-Z| | | }} | |||
{{mrow7| | | Z| Z| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (-1,-1) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | Z| Z| | | }} | |||
{{mrow7| | G| |-Z| | | }} | |||
{{mrow7| | G|-Z|-Z| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| ( 0,+2) | |||
{{pfstart}} | |||
{{mrow7| | | G| | G| | }} | |||
{{mrow7| | | G| G| G| | }} | |||
{{mrow7| | | Z| Z| | | }} | |||
{{mrow7| | | | Z| | | }} | |||
{{mrow7| | | Z| Z| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (-1,+2) | |||
{{pfstart}} | |||
{{mrow7| | G| | G| | | }} | |||
{{mrow7| | G| G| G| | | }} | |||
{{mrow7| | | Z| Z| | | }} | |||
{{mrow7| | | | Z| | | }} | |||
{{mrow7| | | Z| Z| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | Z| | Z| | }} | |||
{{mrow7| | |-Z|-Z|-Z| | }} | |||
{{mrow7| | | G| | G| | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| ( 0,+1) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | |-Z| G|-Z| | }} | |||
{{mrow7| | |-Z| Z|-Z| | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| | |||
| | |||
| | |||
|- align=center | |||
! bgcolor=#8AF | R⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | G|-Z| Z| | }} | |||
{{mrow7| | | |-Z| | | }} | |||
{{mrow7| | | G|-Z| Z| | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | |-Z|-Z| | }} | |||
{{mrow7| | | | Z| G| | }} | |||
{{mrow7| | | |-Z|-Z| | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| | |||
| | |||
| | |||
|} | |||
=== W pentomino kicks === | |||
{| border=1 cellspacing=0 style="text-align:center;" | |||
|- | |||
! width=45 | | |||
! bgcolor=#8AF colspan=5 | Kick Tests | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒R | |||
| width=100 |( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| width=100 | (-1, 0) | |||
| width=100 | (-1,+1) | |||
| width=100 | ( 0,-2) | |||
| width=100 | (-1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | R⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,-1) | |||
| ( 0,+2) | |||
| (+1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 2⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,+1) | |||
| ( 0,-2) | |||
| (+1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | L⇒0 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (-1, 0) | |||
| (-1,-1) | |||
| ( 0,+2) | |||
| (-1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| ( 0,+1) | |||
| | |||
| | |||
| | |||
|- align=center | |||
! bgcolor=#8AF | R⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| | |||
| | |||
| | |||
|} | |||
=== X pentomino kicks === | |||
Technically, X pentomino has SRS kick table applied, but it's impossible to perform a wallkick with this piece. | |||
=== J pentomino kicks === | |||
{| border=1 cellspacing=0 style="text-align:center;" | |||
|- | |||
! width=45 | | |||
! bgcolor=#8AF colspan=5 | Kick Tests | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒R | |||
| width=100 |( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| width=100 | (-1, 0) | |||
| width=100 | (-1,+1) | |||
| width=100 | ( 0,-2) | |||
| width=100 | (-1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | R⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,-1) | |||
| ( 0,+2) | |||
| (+1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 2⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,+1) | |||
| ( 0,-2) | |||
| (+1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | L⇒0 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (-1, 0) | |||
| (-1,-1) | |||
| ( 0,+2) | |||
| (-1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| ( 0,+1) | |||
| | |||
| | |||
| | |||
|- align=center | |||
! bgcolor=#8AF | R⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| | |||
| | |||
| | |||
|} | |||
=== L pentomino kicks === | |||
{| border=1 cellspacing=0 style="text-align:center;" | |||
|- | |||
! width=45 | | |||
! bgcolor=#8AF colspan=5 | Kick Tests | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒R | |||
| width=100 |( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| width=100 | (-1, 0) | |||
| width=100 | (-1,+1) | |||
| width=100 | ( 0,-2) | |||
| width=100 | (-1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | R⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,-1) | |||
| ( 0,+2) | |||
| (+1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 2⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,+1) | |||
| ( 0,-2) | |||
| (+1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | L⇒0 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (-1, 0) | |||
| (-1,-1) | |||
| ( 0,+2) | |||
| (-1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| ( 0,+1) | |||
| | |||
| | |||
| | |||
|- align=center | |||
! bgcolor=#8AF | R⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| | |||
| | |||
| | |||
|} | |||
=== N' pentomino kicks === | |||
{| border=1 cellspacing=0 style="text-align:center;" | |||
|- | |||
! width=45 | | |||
! bgcolor=#8AF colspan=5 | Kick Tests | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒R | |||
| width=100 |( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| width=100 | (-1, 0) | |||
| width=100 | (-1,+1) | |||
| width=100 | ( 0,-2) | |||
| width=100 | (-1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | R⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,-1) | |||
| ( 0,+2) | |||
| (+1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 2⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,+1) | |||
| ( 0,-2) | |||
| (+1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | L⇒0 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (-1, 0) | |||
| (-1,-1) | |||
| ( 0,+2) | |||
| (-1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| ( 0,+1) | |||
| | |||
| | |||
| | |||
|- align=center | |||
! bgcolor=#8AF | R⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| | |||
| | |||
| | |||
|} | |||
=== N pentomino kicks === | |||
{| border=1 cellspacing=0 style="text-align:center;" | |||
|- | |||
! width=45 | | |||
! bgcolor=#8AF colspan=5 | Kick Tests | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒R | |||
| width=100 |( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| width=100 | (-1, 0) | |||
| width=100 | (-1,+1) | |||
| width=100 | ( 0,-2) | |||
| width=100 | (-1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | R⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,-1) | |||
| ( 0,+2) | |||
| (+1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 2⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,+1) | |||
| ( 0,-2) | |||
| (+1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | L⇒0 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (-1, 0) | |||
| (-1,-1) | |||
| ( 0,+2) | |||
| (-1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| ( 0,+1) | |||
| | |||
| | |||
| | |||
|- align=center | |||
! bgcolor=#8AF | R⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| | |||
| | |||
| | |||
|} | |||
=== Y pentomino kicks === | |||
{| border=1 cellspacing=0 style="text-align:center;" | |||
|- | |||
! width=45 | | |||
! bgcolor=#8AF colspan=5 | Kick Tests | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒R | |||
| width=100 |( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| width=100 | (-1, 0) | |||
| width=100 | (-1,+1) | |||
| width=100 | ( 0,-2) | |||
| width=100 | (-1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | R⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,-1) | |||
| ( 0,+2) | |||
| (+1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 2⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,+1) | |||
| ( 0,-2) | |||
| (+1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | L⇒0 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (-1, 0) | |||
| (-1,-1) | |||
| ( 0,+2) | |||
| (-1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| ( 0,+1) | |||
| | |||
| | |||
| | |||
|- align=center | |||
! bgcolor=#8AF | R⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| | |||
| | |||
| | |||
|} | |||
=== Y' pentomino kicks === | |||
{| border=1 cellspacing=0 style="text-align:center;" | |||
|- | |||
! width=45 | | |||
! bgcolor=#8AF colspan=5 | Kick Tests | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒R | |||
| width=100 |( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| width=100 | (-1, 0) | |||
| width=100 | (-1,+1) | |||
| width=100 | ( 0,-2) | |||
| width=100 | (-1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | R⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,-1) | |||
| ( 0,+2) | |||
| (+1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 2⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,+1) | |||
| ( 0,-2) | |||
| (+1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | L⇒0 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (-1, 0) | |||
| (-1,-1) | |||
| ( 0,+2) | |||
| (-1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| ( 0,+1) | |||
| | |||
| | |||
| | |||
|- align=center | |||
! bgcolor=#8AF | R⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| | |||
| | |||
| | |||
|} | |||
=== P pentomino kicks === | |||
{| border=1 cellspacing=0 style="text-align:center;" | |||
|- | |||
! width=45 | | |||
! bgcolor=#8AF colspan=5 | Kick Tests | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒R | |||
| width=100 |( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| width=100 | (-1, 0) | |||
| width=100 | (-1,+1) | |||
| width=100 | ( 0,-2) | |||
| width=100 | (-1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | R⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,-1) | |||
| ( 0,+2) | |||
| (+1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 2⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,+1) | |||
| ( 0,-2) | |||
| (+1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | L⇒0 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (-1, 0) | |||
| (-1,-1) | |||
| ( 0,+2) | |||
| (-1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| ( 0,+1) | |||
| | |||
| | |||
| | |||
|- align=center | |||
! bgcolor=#8AF | R⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| | |||
| | |||
| | |||
|} | |||
=== Q pentomino kicks === | |||
{| border=1 cellspacing=0 style="text-align:center;" | |||
|- | |||
! width=45 | | |||
! bgcolor=#8AF colspan=5 | Kick Tests | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒R | |||
| width=100 |( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| width=100 | (-1, 0) | |||
| width=100 | (-1,+1) | |||
| width=100 | ( 0,-2) | |||
| width=100 | (-1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | R⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,-1) | |||
| ( 0,+2) | |||
| (+1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 2⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,+1) | |||
| ( 0,-2) | |||
| (+1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | L⇒0 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (-1, 0) | |||
| (-1,-1) | |||
| ( 0,+2) | |||
| (-1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| ( 0,+1) | |||
| | |||
| | |||
| | |||
|- align=center | |||
! bgcolor=#8AF | R⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| | |||
| | |||
| | |||
|} | |||
=== F pentomino kicks === | |||
{| border=1 cellspacing=0 style="text-align:center;" | |||
|- | |||
! width=45 | | |||
! bgcolor=#8AF colspan=5 | Kick Tests | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒R | |||
| width=100 |( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| width=100 | (-1, 0) | |||
| width=100 | (-1,+1) | |||
| width=100 | ( 0,-2) | |||
| width=100 | (-1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | R⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,-1) | |||
| ( 0,+2) | |||
| (+1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 2⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,+1) | |||
| ( 0,-2) | |||
| (+1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | L⇒0 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (-1, 0) | |||
| (-1,-1) | |||
| ( 0,+2) | |||
| (-1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| ( 0,+1) | |||
| | |||
| | |||
| | |||
|- align=center | |||
! bgcolor=#8AF | R⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| | |||
| | |||
| | |||
|} | |||
=== F' pentomino kicks === | |||
{| border=1 cellspacing=0 style="text-align:center;" | |||
|- | |||
! width=45 | | |||
! bgcolor=#8AF colspan=5 | Kick Tests | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒R | |||
| width=100 |( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| width=100 | (-1, 0) | |||
| width=100 | (-1,+1) | |||
| width=100 | ( 0,-2) | |||
| width=100 | (-1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | R⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,-1) | |||
| ( 0,+2) | |||
| (+1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 2⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,+1) | |||
| ( 0,-2) | |||
| (+1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | L⇒0 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (-1, 0) | |||
| (-1,-1) | |||
| ( 0,+2) | |||
| (-1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| ( 0,+1) | |||
| | |||
| | |||
| | |||
|- align=center | |||
! bgcolor=#8AF | R⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| | |||
| | |||
| | |||
|} | |||
=== Z pentomino kicks === | |||
{| border=1 cellspacing=0 style="text-align:center;" | |||
|- | |||
! width=45 | | |||
! bgcolor=#8AF colspan=5 | Kick Tests | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒R | |||
| width=100 |( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| width=100 | (-1, 0) | |||
| width=100 | (-1,+1) | |||
| width=100 | ( 0,-2) | |||
| width=100 | (-1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | R⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,-1) | |||
| ( 0,+2) | |||
| (+1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 2⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,+1) | |||
| ( 0,-2) | |||
| (+1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | L⇒0 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (-1, 0) | |||
| (-1,-1) | |||
| ( 0,+2) | |||
| (-1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| ( 0,+1) | |||
| | |||
| | |||
| | |||
|- align=center | |||
! bgcolor=#8AF | R⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| | |||
| | |||
| | |||
|} | |||
=== S pentomino kicks === | |||
{| border=1 cellspacing=0 style="text-align:center;" | |||
|- | |||
! width=45 | | |||
! bgcolor=#8AF colspan=5 | Kick Tests | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒R | |||
| width=100 |( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| width=100 | (-1, 0) | |||
| width=100 | (-1,+1) | |||
| width=100 | ( 0,-2) | |||
| width=100 | (-1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | R⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,-1) | |||
| ( 0,+2) | |||
| (+1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 2⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| (+1,+1) | |||
| ( 0,-2) | |||
| (+1,-2) | |||
|- align=center | |||
! bgcolor=#8AF | L⇒0 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (-1, 0) | |||
| (-1,-1) | |||
| ( 0,+2) | |||
| (-1,+2) | |||
|- align=center | |||
! bgcolor=#8AF | 0⇒2 | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| ( 0,+1) | |||
| | |||
| | |||
| | |||
|- align=center | |||
! bgcolor=#8AF | R⇒L | |||
| ( 0, 0) | |||
{{pfstart}} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | C| | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{mrow7| | | | | | | }} | |||
{{pfend}} | |||
| (+1, 0) | |||
| | |||
| | |||
| | |||
|} |
Revision as of 20:40, 30 July 2024
Pentomino Wall Kick Illustration
Please note that the pentomino naming used here follows the Golomb convention, extended with mirrored chiral pentomino names as seen in Wikipedia.
I pentomino kicks
Kick Tests | Useful Kicks | |||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|
0⇒R | ( 0, 0)
|
(-2, 0)
|
(+1, 0)
|
(-2,-1)
|
(+1,+2)
|
|||||||
R⇒2 | ( 0, 0)
|
(-1, 0)
|
(+2, 0)
|
(-1,+2)
|
(+2,-1)
|
|||||||
2⇒L | ( 0, 0)
|
(+2, 0)
|
(-1, 0)
|
(+2,+1)
|
(-1,-2)
|
|||||||
L⇒0 | ( 0, 0)
|
(+1, 0)
|
(-2, 0)
|
(+1,-2)
|
(-2,+1)
|
(+1,-2)
|
Kick Tests | Useful Kicks | |||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|
0⇒L | ( 0, 0)
|
(-1, 0)
|
(+2, 0)
|
(-1,+2)
|
(+2,-1)
|
|||||||
L⇒2 | ( 0, 0)
|
(-2, 0)
|
(+1, 0)
|
(-2,-1)
|
(+1,+2)
|
|||||||
2⇒R | ( 0, 0)
|
(+1, 0)
|
(-2, 0)
|
(+1,-2)
|
(-2,+1)
|
|||||||
R⇒0 | ( 0, 0)
|
(+2, 0)
|
(-1, 0)
|
(+2,+1)
|
(-1,-2)
|
(-1,-2)
|
V pentomino kicks
Kick Tests | ||||||||||
---|---|---|---|---|---|---|---|---|---|---|
0⇒R | ( 0, 0)
|
(-1, 0)
|
(-1,+1)
|
( 0,-2)
|
(-1,-2)
| |||||
R⇒2 | ( 0, 0)
|
(+1, 0)
|
(+1,-1)
|
( 0,+2)
|
(+1,+2)
| |||||
2⇒L | ( 0, 0)
|
(+1, 0)
|
(+1,+1)
|
( 0,-2)
|
(+1,-2)
| |||||
L⇒0 | ( 0, 0)
|
(-1, 0)
|
(-1,-1)
|
( 0,+2)
|
(-1,+2)
| |||||
0⇒2 | ( 0, 0)
|
( 0,+1)
|
||||||||
R⇒L | ( 0, 0)
|
(+1, 0)
|
T pentomino kicks
Kick Tests | ||||||||||
---|---|---|---|---|---|---|---|---|---|---|
0⇒R | ( 0, 0)
|
(-1, 0)
|
(-1,+1)
|
( 0,-2)
|
(-1,-2)
| |||||
R⇒2 | ( 0, 0)
|
(+1, 0)
|
(+1,-1)
|
( 0,+2)
|
(+1,+2)
| |||||
2⇒L | ( 0, 0)
|
(+1, 0)
|
(+1,+1)
|
( 0,-2)
|
(+1,-2)
| |||||
L⇒0 | ( 0, 0)
|
(-1, 0)
|
(-1,-1)
|
( 0,+2)
|
(-1,+2)
| |||||
0⇒2 | ( 0, 0)
|
( 0,+1)
|
||||||||
R⇒L | ( 0, 0)
|
(+1, 0)
|
U pentomino kicks
Kick Tests | ||||||||||
---|---|---|---|---|---|---|---|---|---|---|
0⇒R | ( 0, 0)
|
(-1, 0)
|
(-1,+1)
|
( 0,-2)
|
(-1,-2)
| |||||
R⇒2 | ( 0, 0)
|
(+1, 0)
|
(+1,-1)
|
( 0,+2)
|
(+1,+2)
| |||||
2⇒L | ( 0, 0)
|
(+1, 0)
|
(+1,+1)
|
( 0,-2)
|
(+1,-2)
| |||||
L⇒0 | ( 0, 0)
|
(-1, 0)
|
(-1,-1)
|
( 0,+2)
|
(-1,+2)
| |||||
0⇒2 | ( 0, 0)
|
( 0,+1)
|
||||||||
R⇒L | ( 0, 0)
|
(+1, 0)
|
W pentomino kicks
Kick Tests | ||||||
---|---|---|---|---|---|---|
0⇒R | ( 0, 0)
|
(-1, 0) | (-1,+1) | ( 0,-2) | (-1,-2) | |
R⇒2 | ( 0, 0)
|
(+1, 0) | (+1,-1) | ( 0,+2) | (+1,+2) | |
2⇒L | ( 0, 0)
|
(+1, 0) | (+1,+1) | ( 0,-2) | (+1,-2) | |
L⇒0 | ( 0, 0)
|
(-1, 0) | (-1,-1) | ( 0,+2) | (-1,+2) | |
0⇒2 | ( 0, 0)
|
( 0,+1) | ||||
R⇒L | ( 0, 0)
|
(+1, 0) |
X pentomino kicks
Technically, X pentomino has SRS kick table applied, but it's impossible to perform a wallkick with this piece.
J pentomino kicks
Kick Tests | ||||||
---|---|---|---|---|---|---|
0⇒R | ( 0, 0)
|
(-1, 0) | (-1,+1) | ( 0,-2) | (-1,-2) | |
R⇒2 | ( 0, 0)
|
(+1, 0) | (+1,-1) | ( 0,+2) | (+1,+2) | |
2⇒L | ( 0, 0)
|
(+1, 0) | (+1,+1) | ( 0,-2) | (+1,-2) | |
L⇒0 | ( 0, 0)
|
(-1, 0) | (-1,-1) | ( 0,+2) | (-1,+2) | |
0⇒2 | ( 0, 0)
|
( 0,+1) | ||||
R⇒L | ( 0, 0)
|
(+1, 0) |
L pentomino kicks
Kick Tests | ||||||
---|---|---|---|---|---|---|
0⇒R | ( 0, 0)
|
(-1, 0) | (-1,+1) | ( 0,-2) | (-1,-2) | |
R⇒2 | ( 0, 0)
|
(+1, 0) | (+1,-1) | ( 0,+2) | (+1,+2) | |
2⇒L | ( 0, 0)
|
(+1, 0) | (+1,+1) | ( 0,-2) | (+1,-2) | |
L⇒0 | ( 0, 0)
|
(-1, 0) | (-1,-1) | ( 0,+2) | (-1,+2) | |
0⇒2 | ( 0, 0)
|
( 0,+1) | ||||
R⇒L | ( 0, 0)
|
(+1, 0) |
N' pentomino kicks
Kick Tests | ||||||
---|---|---|---|---|---|---|
0⇒R | ( 0, 0)
|
(-1, 0) | (-1,+1) | ( 0,-2) | (-1,-2) | |
R⇒2 | ( 0, 0)
|
(+1, 0) | (+1,-1) | ( 0,+2) | (+1,+2) | |
2⇒L | ( 0, 0)
|
(+1, 0) | (+1,+1) | ( 0,-2) | (+1,-2) | |
L⇒0 | ( 0, 0)
|
(-1, 0) | (-1,-1) | ( 0,+2) | (-1,+2) | |
0⇒2 | ( 0, 0)
|
( 0,+1) | ||||
R⇒L | ( 0, 0)
|
(+1, 0) |
N pentomino kicks
Kick Tests | ||||||
---|---|---|---|---|---|---|
0⇒R | ( 0, 0)
|
(-1, 0) | (-1,+1) | ( 0,-2) | (-1,-2) | |
R⇒2 | ( 0, 0)
|
(+1, 0) | (+1,-1) | ( 0,+2) | (+1,+2) | |
2⇒L | ( 0, 0)
|
(+1, 0) | (+1,+1) | ( 0,-2) | (+1,-2) | |
L⇒0 | ( 0, 0)
|
(-1, 0) | (-1,-1) | ( 0,+2) | (-1,+2) | |
0⇒2 | ( 0, 0)
|
( 0,+1) | ||||
R⇒L | ( 0, 0)
|
(+1, 0) |
Y pentomino kicks
Kick Tests | ||||||
---|---|---|---|---|---|---|
0⇒R | ( 0, 0)
|
(-1, 0) | (-1,+1) | ( 0,-2) | (-1,-2) | |
R⇒2 | ( 0, 0)
|
(+1, 0) | (+1,-1) | ( 0,+2) | (+1,+2) | |
2⇒L | ( 0, 0)
|
(+1, 0) | (+1,+1) | ( 0,-2) | (+1,-2) | |
L⇒0 | ( 0, 0)
|
(-1, 0) | (-1,-1) | ( 0,+2) | (-1,+2) | |
0⇒2 | ( 0, 0)
|
( 0,+1) | ||||
R⇒L | ( 0, 0)
|
(+1, 0) |
Y' pentomino kicks
Kick Tests | ||||||
---|---|---|---|---|---|---|
0⇒R | ( 0, 0)
|
(-1, 0) | (-1,+1) | ( 0,-2) | (-1,-2) | |
R⇒2 | ( 0, 0)
|
(+1, 0) | (+1,-1) | ( 0,+2) | (+1,+2) | |
2⇒L | ( 0, 0)
|
(+1, 0) | (+1,+1) | ( 0,-2) | (+1,-2) | |
L⇒0 | ( 0, 0)
|
(-1, 0) | (-1,-1) | ( 0,+2) | (-1,+2) | |
0⇒2 | ( 0, 0)
|
( 0,+1) | ||||
R⇒L | ( 0, 0)
|
(+1, 0) |
P pentomino kicks
Kick Tests | ||||||
---|---|---|---|---|---|---|
0⇒R | ( 0, 0)
|
(-1, 0) | (-1,+1) | ( 0,-2) | (-1,-2) | |
R⇒2 | ( 0, 0)
|
(+1, 0) | (+1,-1) | ( 0,+2) | (+1,+2) | |
2⇒L | ( 0, 0)
|
(+1, 0) | (+1,+1) | ( 0,-2) | (+1,-2) | |
L⇒0 | ( 0, 0)
|
(-1, 0) | (-1,-1) | ( 0,+2) | (-1,+2) | |
0⇒2 | ( 0, 0)
|
( 0,+1) | ||||
R⇒L | ( 0, 0)
|
(+1, 0) |
Q pentomino kicks
Kick Tests | ||||||
---|---|---|---|---|---|---|
0⇒R | ( 0, 0)
|
(-1, 0) | (-1,+1) | ( 0,-2) | (-1,-2) | |
R⇒2 | ( 0, 0)
|
(+1, 0) | (+1,-1) | ( 0,+2) | (+1,+2) | |
2⇒L | ( 0, 0)
|
(+1, 0) | (+1,+1) | ( 0,-2) | (+1,-2) | |
L⇒0 | ( 0, 0)
|
(-1, 0) | (-1,-1) | ( 0,+2) | (-1,+2) | |
0⇒2 | ( 0, 0)
|
( 0,+1) | ||||
R⇒L | ( 0, 0)
|
(+1, 0) |
F pentomino kicks
Kick Tests | ||||||
---|---|---|---|---|---|---|
0⇒R | ( 0, 0)
|
(-1, 0) | (-1,+1) | ( 0,-2) | (-1,-2) | |
R⇒2 | ( 0, 0)
|
(+1, 0) | (+1,-1) | ( 0,+2) | (+1,+2) | |
2⇒L | ( 0, 0)
|
(+1, 0) | (+1,+1) | ( 0,-2) | (+1,-2) | |
L⇒0 | ( 0, 0)
|
(-1, 0) | (-1,-1) | ( 0,+2) | (-1,+2) | |
0⇒2 | ( 0, 0)
|
( 0,+1) | ||||
R⇒L | ( 0, 0)
|
(+1, 0) |
F' pentomino kicks
Kick Tests | ||||||
---|---|---|---|---|---|---|
0⇒R | ( 0, 0)
|
(-1, 0) | (-1,+1) | ( 0,-2) | (-1,-2) | |
R⇒2 | ( 0, 0)
|
(+1, 0) | (+1,-1) | ( 0,+2) | (+1,+2) | |
2⇒L | ( 0, 0)
|
(+1, 0) | (+1,+1) | ( 0,-2) | (+1,-2) | |
L⇒0 | ( 0, 0)
|
(-1, 0) | (-1,-1) | ( 0,+2) | (-1,+2) | |
0⇒2 | ( 0, 0)
|
( 0,+1) | ||||
R⇒L | ( 0, 0)
|
(+1, 0) |
Z pentomino kicks
Kick Tests | ||||||
---|---|---|---|---|---|---|
0⇒R | ( 0, 0)
|
(-1, 0) | (-1,+1) | ( 0,-2) | (-1,-2) | |
R⇒2 | ( 0, 0)
|
(+1, 0) | (+1,-1) | ( 0,+2) | (+1,+2) | |
2⇒L | ( 0, 0)
|
(+1, 0) | (+1,+1) | ( 0,-2) | (+1,-2) | |
L⇒0 | ( 0, 0)
|
(-1, 0) | (-1,-1) | ( 0,+2) | (-1,+2) | |
0⇒2 | ( 0, 0)
|
( 0,+1) | ||||
R⇒L | ( 0, 0)
|
(+1, 0) |
S pentomino kicks
Kick Tests | ||||||
---|---|---|---|---|---|---|
0⇒R | ( 0, 0)
|
(-1, 0) | (-1,+1) | ( 0,-2) | (-1,-2) | |
R⇒2 | ( 0, 0)
|
(+1, 0) | (+1,-1) | ( 0,+2) | (+1,+2) | |
2⇒L | ( 0, 0)
|
(+1, 0) | (+1,+1) | ( 0,-2) | (+1,-2) | |
L⇒0 | ( 0, 0)
|
(-1, 0) | (-1,-1) | ( 0,+2) | (-1,+2) | |
0⇒2 | ( 0, 0)
|
( 0,+1) | ||||
R⇒L | ( 0, 0)
|
(+1, 0) |