?$證明:∵DE//AB$? ?$∴∠EDC=∠B$? ?$在△ABC和△CDE中$? ?${{\begin{cases} {{∠B=∠EDC}} \\ {AB=CD} \\ {∠A=∠DCE} \end{cases}}}$? ?$∴△ABC≌△CDE(ASA)����,$∴DE=BC?
?$ 解:∵D是BC中點(diǎn)$? ?$∴S_{△ABC}=2S_{△ADC}=2×\frac {1}{2}×AD×CE=10$?
(更多請(qǐng)點(diǎn)擊查看作業(yè)精靈詳解)
(更多請(qǐng)點(diǎn)擊查看作業(yè)精靈詳解) (更多請(qǐng)點(diǎn)擊查看作業(yè)精靈詳解)
$證明:∵D是BC中點(diǎn)$ $∴BD=CD$ $在△BDF和△CDE中$ ${{\begin{cases} {{∠BFD=∠CED}} \\ {∠BDF=∠CDE} \\ {BD=CD} \end{cases}}}$ $∴△BDF≌△CDE(AAS)$
$證明:∵AD//BC$ $∴∠ADB=∠CBD$ $在△ADB和△CBD中$ ${{\begin{cases} {{∠BAD=∠DCB}} \\ {∠ADB=∠CBD} \\ {DB=BD} \end{cases}}}$ $∴△ADB≌△CBD(AAS)$ $∴AD=CB$
$證明:∵∠ADB=∠CBD$ $∴180°-∠ADB=180°-∠CBD$ $即∠ADE=∠CBF$ $在△ADE和△CBF中$ ${{\begin{cases} {{AD=CB}} \\ {∠ADE=∠CBF} \\ {DE=BF} \end{cases}}}$ $∴△ADE≌△CBF(SAS)$ $∴∠E=∠F$ $∴AE//CF$
解:  記∠ABC=40°,在BC上截BD=1cm,在BA上截 BE=2cm,連接ED △BDE即為所求
解:能 
作∠QPG=∠ABC=40°,在PG上截PN=1cm,以N為圓心以2cm長(zhǎng)為半徑畫弧交PQ于M △PMN即為所求
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