5. 如图,AD//BC,∠1 = ∠B.
(1)求证:AB//DE;
(2)若∠A = 120°,CD⊥AD,求∠EDC的度数.
请完成下面的解答过程,并在括号里填上依据.
解:(1)∵ AD//BC(已知),∴ ∠1 = ________( ).
又∵ ∠1 = ∠B(已知),∴ ∠B = ________.
∴ AB//DE( ).
(2)由(1)已证AB//DE,∴ ∠A + ________ = 180°( ).
∵ ∠A = 120°,∴ ∠1 = ________°(等式的基本事实).
∵ CD⊥AD(已知),∴ ∠ADC = 90°(垂直的定义).
∴ ∠EDC = ________°.
(1)求证:AB//DE;
(2)若∠A = 120°,CD⊥AD,求∠EDC的度数.
请完成下面的解答过程,并在括号里填上依据.
解:(1)∵ AD//BC(已知),∴ ∠1 = ________( ).
又∵ ∠1 = ∠B(已知),∴ ∠B = ________.
∴ AB//DE( ).
(2)由(1)已证AB//DE,∴ ∠A + ________ = 180°( ).
∵ ∠A = 120°,∴ ∠1 = ________°(等式的基本事实).
∵ CD⊥AD(已知),∴ ∠ADC = 90°(垂直的定义).
∴ ∠EDC = ________°.
答案
(1) $\angle DEC$ 两直线平行,内错角相等 $\angle DEC$ 同位角相等,两直线平行 (2) $\angle 1$ 两直线平行,同旁内角互补 60 30
6. 如图,点F在AB上,点E在CD上,AE,DF分别交BC于点H,G,∠A = ∠D,∠FGB + ∠EHG = 180°.
(1)求证:AB//CD;
(2)若AE⊥BC,直接写出图中所有与∠C互余的角,不需要证明.

(1)求证:AB//CD;
(2)若AE⊥BC,直接写出图中所有与∠C互余的角,不需要证明.
答案
(1) $\because \angle FGB+\angle EHG = 180^{\circ },\therefore \angle HGD+\angle EHG=180^{\circ }.\therefore AE// DF.\therefore \angle A+\angle AFD = 180^{\circ }$. 又 $\because \angle A=\angle D,\therefore \angle D+\angle AFD = 180^{\circ }.\therefore AB// CD$ (2) $\because AE\bot BC,\therefore \angle CHE = 90^{\circ }.\therefore \angle C+\angle AEC = 90^{\circ }$,即 $\angle C$ 与 $\angle AEC$ 互余. $\because AE// DF,\therefore \angle AEC=\angle D,\angle A=\angle BFG.\because AB// CD,\therefore \angle AEC=\angle A$. 综上所述,与 $\angle C$ 互余的角有 $\angle AEC,\angle A,\angle D,\angle BFG$
7. 如图,在三角形ABC中,过点A作AD⊥BC,垂足为D,E为AB上一点,过点E作EF⊥BC,垂足为F,过点D作DG//AB,交AC于点G.
(1)依题意补全图形;
(2)请你判断∠BEF与∠ADG的数量关系,并加以证明.

(1)依题意补全图形;
(2)请你判断∠BEF与∠ADG的数量关系,并加以证明.
答案
(1) 如图所示 (2) $\angle BEF=\angle ADG$ $\because AD\bot BC,EF\bot BC,\therefore \angle ADF=\angle EFB = 90^{\circ }.\therefore AD// EF.\therefore \angle BEF=\angle BAD.\because DG// AB,\therefore \angle BAD=\angle ADG.\therefore \angle BEF=\angle ADG$
8. 如图,AB//CD,E是直线FD上的一点,∠ABC = 140°,∠CDF = 40°.
(1)求证:BC//EF.
(2)连接BD,AE. 若BD//AE,∠BAE = 110°,求证:BD平分∠ABC.

(1)求证:BC//EF.
(2)连接BD,AE. 若BD//AE,∠BAE = 110°,求证:BD平分∠ABC.
答案
(1) $\because AB// CD,\therefore \angle ABC+\angle BCD = 180^{\circ }.\because \angle ABC=140^{\circ },\therefore \angle BCD = 40^{\circ }.\because \angle CDF = 40^{\circ },\therefore \angle BCD=\angle CDF.\therefore BC// EF$ (2) $\because AE// BD,\therefore \angle BAE+\angle ABD = 180^{\circ }.\because \angle BAE = 110^{\circ },\therefore \angle ABD = 70^{\circ }.\because \angle ABC = 140^{\circ },\therefore \angle DBC = 140^{\circ } - 70^{\circ } = 70^{\circ }.\therefore \angle ABD=\angle DBC.\therefore BD$ 平分 $\angle ABC$
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