题目内容
在△ABC中,点D、E、F顺次在边AB、BC、CA上,设AD=p•AB,BE=q•BC,CF=r•CA,其中p、q、r是正数,且使p+q+r=
,p2+q2+r2=
,则S△DEF:S△ABC=______.
| 2 |
| 3 |
| 2 |
| 5 |
如图:
∵AD=p•AB,BE=q•BC,CF=r•CA,
∴S△ADF=(1-r)•p•S△ABC,S△BDE=(1-q)•r•S△ABC,S△EFC=(1-p)•q•S△ABC,
∴S△DEF=S△ABC-S△ADF-S△BDE-S△EFC=[1-(1-r)•p-(1-q)•r-(1-p)•q]•S△ABC=[1-(p+q+r)+(pr+qy+pq)]•S△ABC,
∵(p+q+r)2=(p2+q2+r2)+2(pr+qr+pq),p+q+r=
,p2+q2+r2=
,
∴pr+qr+pq=
[(p+q+r)2-(p2+q2+r2)]=
,
∴S△DEF=(1-
+
)•S△ABC=
S△ABC,
∴S△DEF:S△ABC=16:45.
故答案为:16:45.
∵AD=p•AB,BE=q•BC,CF=r•CA,
∴S△ADF=(1-r)•p•S△ABC,S△BDE=(1-q)•r•S△ABC,S△EFC=(1-p)•q•S△ABC,
∴S△DEF=S△ABC-S△ADF-S△BDE-S△EFC=[1-(1-r)•p-(1-q)•r-(1-p)•q]•S△ABC=[1-(p+q+r)+(pr+qy+pq)]•S△ABC,
∵(p+q+r)2=(p2+q2+r2)+2(pr+qr+pq),p+q+r=
| 2 |
| 3 |
| 2 |
| 5 |
∴pr+qr+pq=
| 1 |
| 2 |
| 1 |
| 45 |
∴S△DEF=(1-
| 2 |
| 3 |
| 1 |
| 45 |
| 16 |
| 45 |
∴S△DEF:S△ABC=16:45.
故答案为:16:45.
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