【答案】(1) y=x2﹣6x+5�;(2) 當(dāng)點(diǎn)P的坐標(biāo)為(3,2)時(shí)��,PA+PC取最小值��,最小值為5
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【解析】
(1)由頂點(diǎn)坐標(biāo)將二次函數(shù)的解析式設(shè)成y=a(x-3)2-4�,由該函數(shù)圖象上一點(diǎn)的坐標(biāo),利用待定系數(shù)法即可求出二次函數(shù)的解析式��;
(2)利用二次函數(shù)圖象上點(diǎn)的坐標(biāo)特征可求出點(diǎn)A����、B、C的坐標(biāo)�����,由二次函數(shù)圖象的對(duì)稱性可得出連接BC交拋物線對(duì)稱軸于點(diǎn)P����,此時(shí)PA+PC取最小值,最小值為BC��,根據(jù)點(diǎn)B、C的坐標(biāo)可求出直線BC的解析式及線段BC的長(zhǎng)度���,再利用一次函數(shù)圖象上點(diǎn)的坐標(biāo)特征即可求出點(diǎn)P的坐標(biāo),此題得解.
(1)∵當(dāng)x=3時(shí)�,y有最小值-4,
∴設(shè)二次函數(shù)解析式為y=a(x-3)2-4.
∵二次函數(shù)圖象經(jīng)過點(diǎn)(-1�����,12)��,
∴12=16a-4���,
∴a=1�,
∴二次函數(shù)的解析式為y=(x-3)2-4=x2-6x+5.
(2)當(dāng)y=0時(shí)���,有x2-6x+5=0�,
解得:x1=1�����,x2=5����,
∴點(diǎn)A的坐標(biāo)為(1�����,0)���,點(diǎn)B的坐標(biāo)為(5,0)�;
當(dāng)x=0時(shí),y=x2-6x+5=5�,
∴點(diǎn)C的坐標(biāo)為(0,5).
連接BC交拋物線對(duì)稱軸于點(diǎn)P�,此時(shí)PA+PC取最小值,最小值為BC�,如圖所示.
設(shè)直線BC的解析式為y=mx+n(m≠0),
將B(5�����,0)���、C(0��,5)代入y=mx+n�,得:
,解得:
�����,
∴直線BC的解析式為y=-x+5.
∵B(5��,0)����、C(0��,5)���,
∴BC=5.
∵當(dāng)x=3時(shí)�����,y=-x+5=2����,
∴當(dāng)點(diǎn)P的坐標(biāo)為(3�,2)時(shí),PA+PC取最小值��,最小值為5.
