三角形ABC中,AD=BC,AD垂直BC,BE垂直AC,G为BC中点。求证:三角形BDF相似于三角形ADC.DF+GF=1/2乘BC.
相似我已证,请告诉我DF+GF=1/2乘BC怎么证
.
综合应用相似和勾股定理
证明:
△BDF∽△ADC
DF/BD=DC/AD
DF=BD*DC/AD
BD=BG+GD , DC=GC- GD=BG - GD , AD=BC ,
勾股定理
FG^2
=FD^2+DG^2
=(BD*DC/AD)^2+DG^2
BD=BG+GD , DC=GC- GD=BG - GD , AD=BC ,
=[(BG +GD)(BG - GD) / BC]^2+DG^2
=(BG^2- GD^2)^2 / BC^2+BC^2*DG^2 / BC^2
=[(BG^2- GD^2)^2 +BC^2*DG^2] / BC^2
=[(BG^2- GD^2)^2 +(2BG)^2*DG^2] / BC^2
=[(BG^2- GD^2)^2 +4 BG^2*DG^2] / BC^2
=(BG^2+GD^2)^2 / BC^2
FG=(BG^2+GD^2 ) / BC
FG+DF
=(BG^2+GD^2 ) / BC+BD*DC/AD
=(BG^2+GD^2 ) / BC+[(BG +GD)(BG - GD)/BC
=(BG^2+GD^2 ) / BC+(BG^2 - GD^2)/BC
=2BG^2 / BC
=2BG^2 /2BG
=BG
=1/2 BC
证明:
△BDF∽△ADC
DF/BD=DC/AD
DF=BD*DC/AD
BD=BG+GD , DC=GC- GD=BG - GD , AD=BC ,
勾股定理
FG^2
=FD^2+DG^2
=(BD*DC/AD)^2+DG^2
BD=BG+GD , DC=GC- GD=BG - GD , AD=BC ,
=[(BG +GD)(BG - GD) / BC]^2+DG^2
=(BG^2- GD^2)^2 / BC^2+BC^2*DG^2 / BC^2
=[(BG^2- GD^2)^2 +BC^2*DG^2] / BC^2
=[(BG^2- GD^2)^2 +(2BG)^2*DG^2] / BC^2
=[(BG^2- GD^2)^2 +4 BG^2*DG^2] / BC^2
=(BG^2+GD^2)^2 / BC^2
FG=(BG^2+GD^2 ) / BC
FG+DF
=(BG^2+GD^2 ) / BC+BD*DC/AD
=(BG^2+GD^2 ) / BC+[(BG +GD)(BG - GD)/BC
=(BG^2+GD^2 ) / BC+(BG^2 - GD^2)/BC
=2BG^2 / BC
=2BG^2 /2BG
=BG
=1/2 BC
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第1个回答 2013-05-09
AD垂直BC,BE垂直AC,角C+角EBC=90°,角C+角CAD=90°,所以角EBC=角CAD,又因为角BDF=角ADC,所以三角形BDF相似于三角形ADC
这个我知道,可关键是怎么证明DF+GF=1/2乘BC。希望你能想到。
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