8—12组3次4阶“等幂和数组链”

潘凤雏

（完成于2003.1.15.22.00） 

8组3次4阶“等幂和数组链”：

 {0,115,120,235}={1,102,133,234}={3,91,144,232}={4,87,148,231}={10,70,165,225}

={15,60,175,220}={22,49,186,213}={25,45,190,210}；

之和为470，之平方和为82,850，之立方和为16,226,750。

 8组3次4阶“等幂和数组链”：

{0,122,131,253}={1,110,143,252}={5,91,162,248}={8,82,171,245}={10,77,176,243}

={17,63,190,236}={28,47,206,225}={36,38,215,217}；

之和为506，之平方和为96,054，之立方和为20,258,216。

9组3次4阶“等幂和数组链”：

{0,188,191,379}={1,170,209,378}={2,162,217,377}={8,135,244,371}={14,118,261,365}

={23,99,280,356}={27,92,287,352}={37,77,302,342}={55,56,323,324}；

之和为758，之平方和为215,466，之立方和为68,052,482。

10组3次4阶“等幂和数组链”：

{0,250,275,525}={3,221,304,522}={5,210,315,520}={7,201,324,518}

={14,177,348,511}={25,150,375,500}={30,140,385,495}={45,115,410,480}

={60,95,430,465}={66,88,437,459}；

之和为1,050，之平方和为413,750，之立方和为181,125,000。

11组3次4阶“等幂和数组链”：

{0,252,311,563}={3,231,332,560}={5,221,342,558}={12,195,368,551}

={14,189,374,549}={24,164,399,539}={33,146,417,530}={45,126,437,518}

={47,123,440,516}={66,98,465,497}={74,89,474,489}；

之和为1,126，之平方和为477,194，之立方和为224,536,786。

12组3次4阶“等幂和数组链”：

{0,265,300,565}={1,253,312,564}={4,232,333,561}={6,222,343,559}

={13,196,369,552}={15,190,375,550}={25,165,400,540}={34,147,418,531}

={46,127,438,519}={48,124,441,517}={67,99,466,498}={75,90,475,490}；

之和为1,130，之平方和为479,450，之立方和为225,971,750。  

二〇〇三年一月十六日星期四