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$解:​(1)△ABE∽△ECD​$
$∵​EC//AB​$
$∴​∠A=∠CED​$
$∵​EB//DC​$
$∴​∠AEB=∠EDC​$
$​(2)​∵​△ABE∽△ECD​$
$∴​\frac {S_{△ABE}}{S_{△ECD}}=(\frac {h_{1}}{h_{2}})^2=\frac 49​$
$∴​\frac {h_{1}}{h_{2}}=\frac 23​$
$∵​\frac {S_{△BCE}}{S_{△CDE}}=\frac {BE}{CD}=\frac {h_{1}}{h_{2}}=\frac 23,​​S_{△CDE}=9​$
$∴​S_{△BCE}=6​$
$解:图①中,设DE=x\ \mathrm {cm},则DG=2x\ \mathrm {cm}$
$∵四边形DEFG 是矩形$
$∴DG//BC$
$∴△ADG∽△ABC$
$∴\frac {AM}{AH}=\frac {DG}{BC}$
$∵DG=2x\ \mathrm {cm},BC=12\ \mathrm {cm},AH=8\ \mathrm {cm}$
$∴\frac {AM}8=\frac {2x}{12}$
$∴AM=\frac 43x\ \mathrm {cm}$
$∵MH=DE=x\ \mathrm {cm}$
$又∵AM+MH=AH$
$∴\frac 43x+x=8$
$解得x=\frac {24}{7}$
$∴S_{矩形DEFG}=DE×DG=\frac {1152}{49}\ \mathrm {cm^2}$
$图②中,设DG=x\ \mathrm {cm},则DE=2x\ \mathrm {cm}$
$同理可得,△ADG∽△ABC$
$∴\frac {AM}{AH}=\frac {DG}{BC}$
$∴AM=\frac 23x\ \mathrm {cm}$
$∵MH=DE=2x\ \mathrm {cm},AM+MH=AH=8\ \mathrm {cm}$
$∴\frac 23x+2x=8$
$解得x=3$
$∴DG=3\ \mathrm {cm},DE=6\ \mathrm {cm}$
$∴S_{矩形DEFG}=DG×DE=18\ \mathrm {cm^2}$
$∵\frac {1152}{49}>18$
∴图①的设计方案更好
$解:由题意得AB=k_{AD},A'B'=kA'D'$
$∵BD=\sqrt {AB^2-AD^2}=\sqrt {k^2-1}AD,B'D'=\sqrt {A'B'^2-A'D'^2}=\sqrt {k^2-1}A'D'$
$∴\frac {BD}{B'D'}=\frac {AD}{A'D'}$
$∵∠ADB=∠A'D'B'=90°$
$∴△ABD∽△A'B'D'$
$∴∠ABD=∠A'B'D'$
$∵∠C=∠C'$
$∴△ABC∽△A'B'C'$
$∴\frac {AB}{A'B'}=\frac {AD}{A'D'}=\frac {BE}{B'E'}$
$∴AD · B'E'=A'D' · BE$
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