发布时间 : 星期一 文章2019年中考数学真题分类训练——专题十:三角形更新完毕开始阅读
53.(2019泸州)如图,AB∥CD,AD和BC相交于点O,OA?OD.求证:OB?OC.
证明:∵AB∥CD,∴?A??D,?B??C,
??A??D?在△AOB和△DOC中,??B??C,
?OA?OD?∴△AOB≌△DOC, ∴OB?OC.
54.(2019重庆A卷)如图,在△ABC中,AB=AC,D是BC边上的中点,连结AD,BE平分∠ABC交
AC于点E,过点E作EF∥BC交AB于点F.
(1)若∠C=36°,求∠BAD的度数.
(2)若点E在边AB上,EF∥AC叫AD的延长线于点F.求证:FB=FE.
证明:(1)∵AB?AC,∴?C??ABC, ∵?C?36?, ∴?ABC?36?,
∵D为BC的中点,∴AD?BC,
∴?BAD?90???ABC?90??36??54?. (2)∵BE平分?ABC,∴?ABE??EBC, 又∵EF∥BC,∴?EBC??BEF,
∴?EBF??FEB, ∴BF?EF.
55.(2019桂林)如图,AB=AD,BC=DC,点E在AC上. (1)求证:AC平分∠BAD; (2)求证:BE=DE.
?AB?AD?
证明:(1)在△ABC与△ADC中,?AC?AC
?BC?DC?
∴△ABC≌△ADC(SSS), ∴∠BAC=∠DAC, 即AC平分∠BAD.
(2)由(1)∠BAE=∠DAE,
?BA?DA?在△BAE与△DAE中,得??BAE??DAE,
?AE?AE?∴△BAE≌△DAE(SAS), ∴BE=DE.
56.(2019黄石)如图,在△ABC中,?BAC?90?,E为边BC上的点,且AB?AE,D为线段BE的中点,过点E作EF?AE,过点A作AF∥BC,且AF、EF相交于点F. (1)求证:?C??BAD; (2)求证:AC?EF.
证明:(1)如图,
∵AB?AE,∴△ABE是等腰三角形, 又∵D为BE的中点,∴AD?BE, 在Rt△ABC和Rt△DBA中,
∵DB为公共角,?BAC??BDA?90?, ∴?C??BAD.
(2)∵AF∥BC,∴?EAF??AEB, ∵AB?AE,∴?ABE??AEB, ∴?EAF??ABC,
又∵?BAC??AEF??90?, ∴△BAC≌△AEF, ∴AC?EF.
57.(2019重庆)如图,在△ABC中,AB=AC,AD⊥BC于点D. (1)若∠C=42°,求∠BAD的度数;
(2)若点E在边AB上,EF∥AC交AD的延长线于点F.求证:AE=FE.
证明:(1)∵AB=AC,AD⊥BC于点D, ∴∠BAD=∠CAD,∠ADC=90°,
又∠C=42°,∴∠BAD=∠CAD=90°-42°=48°. (2)∵AB=AC,AD⊥BC于点D, ∴∠BAD=∠CAD, ∵EF∥AC, ∴∠F=∠CAD, ∴∠BAD=∠F, ∴AE=FE.
58.(2019苏州)如图,△ABC中,点E在BC边上,AE?AB,将线段AC绕点A旋转到AF的位置,使得?CAF??BAE,连接EF,EF与AC交于点G. (1)求证:EF?BC;
(2)若?ABC?65?,?ACB?28?,求?FGC的度数.
证明:(1)∵?CAF??BAE, ∴?BAC??EAF,