① As shown in Figure 6, if point P moves from point M to point B, is there? MB? ==? 4、MP? =? MQ? =? 3,
∴PQ? =? 6. connect EM,
∵△EPQ is an equilateral triangle, ∴ EM ⊥ PQ. ∴ .
∵AB? Point e is on AD.
∴△EPQ and trapezoidal ABCD overlap with △EPQ, whose surface
What is the product? . ?
(2) If point P moves from point B to point M, it is derived from the question.
PQ? =? BM? +? MQ? BP? =? 8、PC? =? 7. Let PE and AD intersect at point F, QE and AD or AD.
The extension line passes through point G, and point P is PH⊥AD at point H, then
HP? =, huh? =? 1. In Rt△HPF, ∠HPF? =? 30 ,?
∴HF? =? 3、PF? =? 6.∴FG? =? FE? =? 2. FD again? =? 2,
As shown in Figure 7, Point G and Point D coincide. At this time △EPQ and trapezoidal ABCD.
The overlapping part of is trapezoidal FPCG with an area of? .
(3) can .4 ≤ t ≤ 5。