题目内容
阅读材料:
已知,如图(1),在面积为S的△ABC中, BC=a,AC=b, AB=c,内切圆O的半径为r.连接OA、OB、OC,△ABC被划分为三个小三角形.
∵ 
.
∴
.
(1)类比推理:若面积为S的四边形ABCD存在内切圆(与各边都相切的圆),如图(2),各边长分别为AB=a,BC=b,CD=c,AD=d,求四边形的内切圆半径r;
(2)理解应用:如图(3),在等腰梯形ABCD中,AB∥DC,AB=21,CD=11,AD=13,⊙O1与⊙O2分别为△ABD与△BCD的内切圆,设它们的半径分别为r1和r2,求
的值.
(1)
(2)
.
【解析】
试题分析:(1)如图,连接OA、OB、OC、OD,则△AOB、△BOC、△COD和△DOA都是以点O为顶点、高都是r的三角形,根据
即可求得四边形的内切圆半径r.
(2)过点D作DE⊥AB于点E,分别求得AE的长,进而BE 的长,然后利用勾股定理求得BD的长;然后根据
,
,两式相除,即可得到
的值.
试题解析:(1)如图(2),连接OA、OB、OC、OD.···················································1分
∵
·3分
∴························································································4分
(2)如图(3),过点D作DE⊥AB于点E,
则
·························································6分
∵AB∥DC,∴
.
又∵
,
∴
.即.···········································································9分
考点:三角形的内切圆与内心;三角形的面积;勾股定理.
