Hmm this first question should go like this, assuming you have to prove DE = EF.
allow the angle sign to be <, I cant remember how to do the actual one
we have to prove that ∆DEG is congruent to ∆EHF
<ABG + <BAD = 180 (cointerior angles)
AB = DG (given), and
AD || BG, therefore quadrilateral ABGD is a parallelogram.
<BCH + <CBE = 180 (cointerior angles)
BC = EH (given), and
BG || CH, therefore quadrilateral BCHE is a parallelogram.
now
<ABG = <ADG (opposite angles of a parallelogram)
<ADG = <DGE (alternate angles)
therefore <ABG = <DGE
now
<ABG = <BCH (corresponding angles)
<BCH = <BEH (opposite angles of a parallelogram)
<BEH = <EHF (alternate angles)
therefore <ABG = <EHF
therefore <DGE = <EHF (angle)
now
<EDX = <DEG (alternate angles, X is a point to the right of the point D on the line AD) and
<EDX = <FEY (corresponding angles, Y is a point to the right of E on the line BE) and
<FEY = <EFH (alternate angles)
therefore <EFH = <EDX and thus
<DEG = <EFH (angle)
since DG = EH (given, side)
∆DGE is congruent to ∆EHF (AAS)
and therefore DE = EF (corresponding sides of congruent triangles)
