(本小题满分11分)如图,已知等边三角形ABC中,点D,E,F分别为边AB,AC,BC的中点,M为直线BC上一动点
(本小题满分11分)如图,已知等边三角形ABC中,点D,E,F分别为边AB,AC,BC的中点,M为直线BC上一动点,△DMN为等边三角形(点M的位置改变时,△DMN也随之整体移动).(1)如图①,当点M在点B左侧时,请你判断EN与MF有怎样的数量关系?点F与直线EN有怎样的位置关系?都请直接写出结论,不必证明或说明理由;(2)如图②,当点M在BC上时,其它条件不变,(1)的结论中EN与MF的数量关系是否仍然成立?若成立,请利用图②证明;若不成立,请说明理由;(3)若点M在点C右侧时,请你在图③中画出相应的图形,并判断(1)的结论中EN与MF的数量关系及点F与直线EN的位置关系是否仍然成立?若成立?请直接写出结论,不必证明或说明理由.
| (1)判断:EN与MF相等(或EN=MF),点F在直线NE上 ······ 3分 (说明:答对一个给2分) (2)成立.································ 4分 证明: 法一:连结DE,DF. ··········································································· 5分 ∵△ABC是等边三角形,∴AB=AC=BC. 又∵D,E,F是三边的中点, ∴DE,DF,EF为三角形的中位线.∴DE=DF=EF,∠FDE=60°. 又∠MDF+∠FDN=60°,∠NDE+∠FDN=60°, ∴∠MDF=∠NDE. ················································································ 7分 在△DMF和△DNE中,DF=DE,DM=DN,∠MDF=∠NDE, ∴△DMF≌△DNE. ··············································································· 8分 ∴MF=NE. ··············································································· 9分  法二: 延长EN,则EN过点F. ······································································ 5分 ∵△ABC是等边三角形,∴AB=AC=BC.又∵D,E,F是三边的中点,∴EF=DF=BF. ∵∠BDM+∠MDF=60°,∠FDN+∠MDF=60°,∴∠BDM=∠FDN.······················· 7分 又∵DM=DN,∠ABM=∠DFN=60°,∴△DBM≌△DFN.································· 8分 ∴BM=FN.∵BF=EF, ∴MF=EN.···························································· 9分 法三: 连结DF,NF. ······················································································ 5分  ∵△ABC是等边三角形,∴AC=BC=AC. 又∵D,E,F是三边的中点,∴DF为三角形的中位线,∴DF=  AC= AB=DB.又∠BDM+∠MDF=60°,∠NDF+∠MDF=60°,∴∠BDM=∠FDN. ………………7分 在△DBM和△DFN中,DF=DB, DM=DN,∠BDM=∠NDF,∴△DBM≌△DFN. ∴∠B=∠DFN=60°.…………………………………………………………………8分 又∵△DEF是△ABC各边中点所构成的三角形, ∴∠DFE=60°.∴可得点N在EF上,∴MF=EN.………………………………9分 (3)画出图形(连出线段NE), ······························································· 10分 MF与EN相等及点F在直线NE上的结论仍然成立(或MF=NE成立). ················ 11分 |
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