y
0))(a?ky?a(x?2)(x?5k 可设抛物线的函数表达式为.2493??222aky?ax?103akx?ak?k?x?a
即.??x G Q 42O ?
??R
GxMG?M 如图,过点作轴于点.N
3M ???0Gk,,0)k,kQ(?2,,0)R(5 ,?? 2??
?10ak), 349??22ak?N(0,
Mk, ,??QG||?k|ON| .
24??3k??|QO|2k,|QR|?|?k,|OG7 , 249722ak10ak?,|MG|?,
421132 ak?7k10ak?35?S?QRON?? .
QNR△
22S?S??SS QMG△QNMQNO△△ONMG梯形111
GMOG?GM)QGONQO?(?ON?
222349491711??2222ak?k?ak?k?ak2??k?1010??ak? ?? 2224242??2114949??33ak?ak?731520????? .?? 精品文档
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21??33)?3::(35akak:?SS?20. ················ 2分 ?? QNR△△QNM4??yN 轴的正半轴交于点.②当抛物线开口向下时,则此抛物线与20?S3:S: 分 1同理,可得. ·····················QNR△QNM△S:S203: 1分···················的值为综上可
知,. QNRQNM△△
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成都中考数学试题及答案
y0))(a?ky?a(x?2)(x?5k可设抛物线的函数表达式为.2493??222aky?ax?103akx?ak?k?x?a即.??xGQ42O???RGxMG?M如图,过点作轴于点.N3M???0Gk,,0)k,kQ(
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