【答案】(1)BC=40;(2)運(yùn)動(dòng)了
秒或20秒時(shí)�,Q到B的距離與P到B的距離相等;(3)點(diǎn)R運(yùn)動(dòng)了
秒或
秒時(shí)恰好滿足MN+AQ=31�,此時(shí)點(diǎn)R所對應(yīng)的數(shù)為﹣
或﹣
.
【解析】
(1)由絕對值的非負(fù)性可求出a,c的值���,進(jìn)而可得出線段AC的長�����,結(jié)合AB= 
AC可求出AB的長�,由BC=AC-AB可求出線段BC的長����;
(2)由AB的長結(jié)合點(diǎn)A對應(yīng)的數(shù)可求出點(diǎn)B對應(yīng)的數(shù),當(dāng)運(yùn)動(dòng)時(shí)間為t秒時(shí)�,點(diǎn)P對應(yīng)的數(shù)為-2t-40��,點(diǎn)Q對應(yīng)的數(shù)為-5t+20��,由Q到B的距離與P到B的距離相等����,可得出關(guān)于t的一元一次方程�,解之即可得出結(jié)論;
(3)當(dāng)運(yùn)動(dòng)時(shí)間為t(t>2)秒時(shí)�,點(diǎn)P對應(yīng)的數(shù)為-2t-40,點(diǎn)Q對應(yīng)的數(shù)為-5t+20�,點(diǎn)R對應(yīng)的數(shù)為t-2-40���,結(jié)合點(diǎn)M為線段PR的中點(diǎn)及點(diǎn)N為線段RQ的中點(diǎn)可得出點(diǎn)M���,N對應(yīng)的數(shù),進(jìn)而可得出線段MN的長�,結(jié)合MN+AQ=31可得出關(guān)于t的一元一次方程,解之即可得出結(jié)論.
(1)∵|a+40|+|c﹣20|=0����,
∴a+40=0,c﹣20=0���,
∴a=﹣40���,c=20��,
∴AC=|﹣40﹣20|=60.
∵AB=AC=20�,
∴BC=AC﹣AB=40.
(2)∵AB=20�����,點(diǎn)A對應(yīng)的數(shù)為﹣40��,且點(diǎn)B在點(diǎn)A的右邊�,
∴點(diǎn)B對應(yīng)的數(shù)為﹣20.
當(dāng)運(yùn)動(dòng)時(shí)間為t秒時(shí),點(diǎn)P對應(yīng)的數(shù)為﹣2t﹣40�,點(diǎn)Q對應(yīng)的數(shù)為﹣5t+20,
∵Q到B的距離與P到B的距離相等��,
∴|﹣2t﹣40﹣(﹣20)|=|﹣5t+20﹣(﹣20)|����,即2t+20=40﹣5t或2t+20=5t﹣40,
解得:t=或t=20.
答:運(yùn)動(dòng)了秒或20秒時(shí)�����,Q到B的距離與P到B的距離相等.
(3)當(dāng)運(yùn)動(dòng)時(shí)間為t(t>2)秒時(shí),點(diǎn)P對應(yīng)的數(shù)為﹣2t﹣40�����,點(diǎn)Q對應(yīng)的數(shù)為﹣5t+20���,點(diǎn)R對應(yīng)的數(shù)為t﹣2﹣40�����,
∵點(diǎn)M為線段PR的中點(diǎn)�����,點(diǎn)N為線段RQ的中點(diǎn)�,AQ=|﹣40﹣(﹣5t+20)|=|5t﹣60|���,
∴點(diǎn)M對應(yīng)的數(shù)為
=﹣
﹣41,點(diǎn)N對應(yīng)的數(shù)為
=﹣2t﹣11��,
∴MN=|﹣﹣41﹣(﹣2t﹣11)|=|
t﹣30|.
∵MN+AQ=31�,
∴|t﹣30|+|5t﹣60|=31.
當(dāng)2<t<12時(shí),30﹣t+60﹣5t=31�����,
解得:t=
;
當(dāng)12≤t≤20時(shí)��,30﹣t+5t﹣60=31����,
解得:t=
;
當(dāng)t>20時(shí)�,t﹣30+5t﹣60=31,
解得:t=
(不合題意���,舍去).
∴t﹣2=﹣或﹣.
當(dāng)t=時(shí)�����,點(diǎn)R對應(yīng)的數(shù)為﹣��;當(dāng)t=時(shí)����,點(diǎn)R對應(yīng)的數(shù)為﹣.
∴點(diǎn)R運(yùn)動(dòng)了秒或秒時(shí)恰好滿足MN+AQ=31�����,此時(shí)點(diǎn)R所對應(yīng)的數(shù)為﹣或﹣.
