And the connecting line of the corresponding point is perpendicular to the crease (if DD' is perpendicular to AE, it can be omitted here)
( 1)
This has nothing to do with folding.
AB=6√2
AC= 12
DC=8√3
AE=DC/2=4√3
(2)
This has nothing to do with folding along AE. Draw a sketch yourself and remove that so as not to affect it. ABC doesn't have to draw either
Draw an ACD, fold it along AC, and draw a symmetrical ACD''
It is easy to prove DP = d'' p.
So DP+EP = D'' P+EP.
Because the line segment between two points is the shortest, the formula is the smallest when P is on the straight line between D'' and E.
Note that DD''C' C is actually a regular triangle.
So the minimum value is 12.
(3)
Connect Dubai and DC.
You can find the area of triangle ad' c, and note that AD'B and BD' c are congruent.
So you can find the BD'C area.
The distance from d' to BC is the height of BD'C based on BC.