∵AC=AD,BC=BE,F、G分别是DC、CE的中点,
∴AF⊥BD,BG⊥AE.
在直角三角形AFB中,
∵H是斜边AB中点,
∴FH=
| 1 |
| 2 |
同理得HG=
| 1 |
| 2 |
∴FH=HG.
(2)∵FH=BH,
∴∠HFB=∠FBH;
∵∠AHF是△BHF的外角,
∴∠AHF=∠HFB+∠FBH=2∠BFH;
同理∠AGH=∠GAH,∠BHG=∠AGH+∠GAH=2∠AGH,
∴∠ADB=∠ACD=∠CAB+∠ABC=∠BFH+∠AGH.
又∵∠DAC=180°-∠ADB-∠ACD,
=180°-2∠ADB,
=180°-2(∠BFH+∠AGH),
=180°-2∠BFH-2∠AGH,
=180°-∠AHF-∠BHG,
而根据平角的定义可得:∠FHG=180°-∠AHF-∠BHG,
∴∠FHG=∠DAC.