题目内容
已知坐标平面内,△ABC的各顶点坐标分别是A(0,1),B(2,-3),C(-2,0),△DEF各顶点坐标分别是D(0,2),E(4,-6),F(-4,0),则△ABC与△DEF的面积之比为______.
∵A(0,1),B(2,-3),C(-2,0),
∴由勾股定理得:AC=
=
,
AB=
=2
,
BC=
=5,
∵D(0,2),E(4,-6),F(-4,0),
∴DE=
=4
,
EF=
=10,
DF=
=2
,
∴
=
=
=
,
∴△ABC∽△DEF,
∴△ABC与△DEF的面积之比是(
)2=
=1:4,
故答案为:1:4.
∴由勾股定理得:AC=
| (-2-0)2+(0-1) |
| 5 |
AB=
| (2-0)2+(-3-1)2 |
| 5 |
BC=
| (-2-2)2+(0+3)2 |
∵D(0,2),E(4,-6),F(-4,0),
∴DE=
| (4-0)2+(-6-2)2 |
| 5 |
EF=
| (-4-4)2+(0+6)2 |
DF=
| (-4-0)2+(0-2)2 |
| 5 |
∴
| AC |
| DF |
| AB |
| DE |
| BC |
| EF |
| 1 |
| 2 |
∴△ABC∽△DEF,
∴△ABC与△DEF的面积之比是(
| 1 |
| 2 |
| 1 |
| 4 |
故答案为:1:4.
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