题目内容
(6分)如图,在△ABC中,AB=AC, AD⊥BC,垂足为D,AE∥BC, DE∥AB.
证明:(1)AE=DC;
(2)四边形ADCE为矩形.
证明:
(1)在△ABC中,∵AB=AC,AD⊥BC,
∴BD=DC······························································································ 1分
∵AE∥BC, DE∥AB,
∴四边形ABDE为平行四边形······································································ 2分
∴BD=AE,···························································································· 3分
∵BD=DC
∴AE = DC.·························································································· 4分
(2)
解法一:∵AE∥BC,AE= DC,
∴四边形ADCE为平行四边形.··································································· 5分
又∵AD⊥BC,
∴∠ADC=90°,
∴四边形ADCE为矩形.··········································································· 6分
解法二:
∵AE∥BC,AE= DC,
∴四边形ADCE为平行四边形······································································ 5分
又∵四边形ABDE为平行四边形
∴AB=DE.∵AB=AC,∴DE=AC.
∴四边形ADCE为矩形.··········································································· 6分
解析:略
英语小英雄天天默写系列答案
暑假作业安徽少年儿童出版社系列答案
20、如图,在△ABC中,∠BAC=45°,现将△ABC绕点A逆时针旋转30°至△ADE的位置,使AC⊥DE,则∠B=
如图,在△ABC中,∠ACB=90°,AC=BC=1,取斜边的中点,向斜边作垂线,画出一个新的等腰三角形,如此继续下去,直到所画出的直角三角形的斜边与△ABC的BC重叠,这时这个三角形的斜边为
2、如图,在△ABC中,DE∥BC,那么图中与∠1相等的角是( )
如图,在△ABC中,AB=AC,且∠A=100°,∠B=