如图,在矩形ABCD中,AD=2AB=4a,矩形AEFG∽矩形ABCD,且AE=4/3a (1)求AG的长 2)试说明△ABE∽△ADG
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(1)∵矩形AEFG∽矩形ABCD
∴AF/AB=AG/AD=3/2
∵AD=4a ∴AG=8/3a
(2)∵ ∠DAG+∠EAF=BAE+∠EAF
∴∠BAE=∠DAG
∵AB/AD=AE/AG=1/2
∴△ABE∽△ADG
======以下答案可供参考======
供参考答案1:
(2)由第一问可得AG=8/3a因为AB=2a,AE=4/3a,AD=4a,AG=8/3a,则AB/AE=AD/AG=3/2,所以△ABE∽△ADG
供参考答案2:
因为矩形AEFG∽矩形ABCD,,则AE/AG=AB/AD则(4/3a)/AG=2a/4a,则AG=8/3a
2.因为AB=2a,AE=4/3a,AD=4a,AG=8/3a,则AB/AE=AD/AG=3/2,所以△ABE∽△ADG