题目:
如图,四边形ABCD中,∠F为四边形ABCD的∠ABC的角平分线及外角∠DCE的平分线所在的直线构成的锐角,若设∠A=α,∠D=β;(1)如图①,α+β>180°,试用α,β表示∠F;
(2)如图②,α+β<180°,请在图中画出∠F,并试用α,β表示∠F;
(3)一定存在∠F吗?如有,求出∠F的值,如不一定,指出α,β满足什么条件时,不存在∠F.
答案
解:(1)∵∠ABC+∠DCB=360°-(α+β),∴∠ABC+(180°-∠DCE)=360°-(α+β)=2∠FBC+(180°-2∠DCF)=180°-2(∠DCF-∠FBC)=180°-2∠F,
∴360°-(α+β)=180°-2∠F,
2∠F=α+β-180°,
∴∠F=
| 1 |
| 2 |
(2)∵∠ABC+∠DCB=360°-(α+β),∴∠ABC+(180°-∠DCE)=360°-(α+β)=2∠GBC+(180°-2∠HCE)=180°+2(∠GBC-∠HCE)=180°+2∠F,
∴360°-(α+β)=180°+2∠F,
∠F=90°-
| 1 |
| 2 |
(3)α+β=180°时,不存在∠F.
解:(1)∵∠ABC+∠DCB=360°-(α+β),
∴∠ABC+(180°-∠DCE)=360°-(α+β)=2∠FBC+(180°-2∠DCF)=180°-2(∠DCF-∠FBC)=180°-2∠F,
∴360°-(α+β)=180°-2∠F,
2∠F=α+β-180°,
∴∠F=
| 1 |
| 2 |
(2)∵∠ABC+∠DCB=360°-(α+β),∴∠ABC+(180°-∠DCE)=360°-(α+β)=2∠GBC+(180°-2∠HCE)=180°+2(∠GBC-∠HCE)=180°+2∠F,
∴360°-(α+β)=180°+2∠F,
∠F=90°-
| 1 |
| 2 |
(3)α+β=180°时,不存在∠F.