∵CD、BE分别是AB、AC边上的高,M是BC的中点,
∴DM=
∴DM=ME
又∵N为DE中点,
∴MN⊥DE;
(2)在△ABC中,∠ABC+∠ACB=180°-∠A,
∵DM=ME=BM=MC,
∴∠BMD+∠CME=(180°-2∠ABC)+(180°-2∠ACB),
=360°-2(∠ABC+∠ACB),
=360°-2(180°-∠A),
=2∠A,
∴∠DME=180°-2∠A;
(3)结论(1)成立,
结论(2)不成立,
理由如下:在△ABC中,∠ABC+∠ACB=180°-∠A,
∵DM=ME=BM=MC,
∴∠BME+∠CMD=2∠ACB+2∠ABC,
=2(180°-∠A),
=360°-2∠A,
∴∠DME=180°-(360°-2∠A),
=2∠A-180°.
