This unofficial TaleSpire pluigin provides a Common Customs Menu (CCM) version of Multi Slab Plugin which allows addition of Slabs and Multoislabs to predefined positions on the board from the CCM menu.
Use R2ModMan or similar installer to install this asset pack.
Open the Common Customs Menu to select slabs or multi slabs from the Slabs section.
The following steps are used to add Slabs or Multislabs:
.slab extension. The contents of the file plain text JSON.{
"autoDrop": false,
"dropX": 0,
"dropY": 0,
"dropZ": 0,
"slabs":
[
{
"code": "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",
"offsetX": 20,
"offsetY": 0,
"offsetZ": 0
},
{
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"offsetX": -20,
"offsetY": 0,
"offsetZ": 0
}
]
}
The above contents contain two slabs.
If autoDrop is true then the two slabs would be dropped at a base location of 0,0,0 with slab applying its own offset from that base location.
Meaning the first slab would be at 20 along the X and the other at -20 along the X.
If autoDrop is false then the base location drop values are replaced by the location that the user selects with each slab being located at its own offset from that location.
Why both the drop position and slab offsets when using autoDrop is true? The slab offsets are intended to position each of the slabs with relation to each other.
The drop position is intended to move the whole result. This means if you have many slabs that you have positioned together properly, you can adjust the position of the whole multislab
by adjusting the drop position instead of having to adjust each slab offset.
autoDrop set to false the spawing is done using a single token which does not show the bounds of the slab area.