快速抢答(先要举手哈)开胃菜2351)计算:(1225251004336342)(1224135)135)(135(22)371()331(3)(12211多项式乘以多项式之乘法公式多项式乘以多项式22)()())(())(())((axaxaxaxbxaxdcba222222222)(aaxxaaxxaxabxbaxbdbcadac1、特殊的二项式相乘:2、平方差公式:3、完全平方公式:两数和的平方两数差的平方多项式的平方试用多项式乘以多项式的法则验证下列各等式的正确性,发现各式的特征,探索规律:bcacabcbacba222)(22223322))((babababa3322))((babababaabccbabcacabcbacba3))((3332223223333)(babbaaba立方和/立方差二项式的n次方立方公式的延伸灵活应用,加深理解:的值。求:已知例xyyxyxxx2,2)()1(12222221)(212212.22)()1(2222222yxxyyxxyyxyxyxxx)(化简得解:由).2)()(2)()(4();)()(3();22)(2)(2();44)(28)(1(22222zxzxzxzxzxzxdcbadcbababayxyx:化简例832)1616(2)44)(44(2)44)(28)(1(2222yxyxyxyxyxyx解:424)2(2)2)(2()22)(2)(2(22bababababababa))()(3(dcbadcba22)()(cadb解:原式222222cacadbdb)2)()(2)()(4(2222zxzxzxzxzxzx22))(())((zxzxzxzx解:原式33)()(zxzx322)(zx64224633zzxzxx);)(()())(())(1(322zyxzyxyxyxzxzyyx:利用公式化简例22222222222222222222224)22())(()()()()()()()()()()()()())(()())(()(xyzyxzyxyxyxyxzyxyxzzyxyxyxyxyxzyxzyxyxyxzyxzyxzyxyxyxzxzyyx解:).)()()((,)2(222zyxzyxzyxzyxyxz化简已知,222yxz解:2222222222222222422)2)(2()2)(2()()())()()((yxxyxyxyzzzxyzxyyxzzxyyxyxzzyxzyxzyxzyxzyx).1011)(911()411)(311)(211)(5();13)(13)(13)(13(3)4(;2014402820152015)3(;2015)2(;9.251.24)1(42222224822222:利用公式计算例90)8.1(50)9.251.24()9.251.24(9.251.24)1(22解:40602252256000040000001515200022000)152000(2015)2(2222222014402820152015)3(1201420152014214201522015222)(解:原式)13)(13)(13)(13(3)4(2482532)13(32)13)(13)(13(32)13)(13)(13)(13(32)13)(13)(13)(13)(13(316164482248248解:原式)1011)(911()411)(311)(211)(5(22222)1011)(1011()911)(911()411)(411()311)(311()211)(211(解:原式1011109910984543343223211011212011阅读下列材料,验证、整理并解题:以求出其余五个。已知任意的两个,就可的七个代数式、下面一个想法:关于可得出再结合平方差公式22222222)(,)(,,,,,,))((babababaabbabababababaabbabababababababa4)()(2)(;2)(22222222可得:根据完全平方公式:.)2(;)1(,5,7122babaabba求:已知例.395275,7.2)(2)()1(222222222baabbaabbabaabbaba,,解:.2929547)(5,74)()()2(2222babaabbaabbaba,,又,.29)(2)(2222baabbaba也可得或由.)2(;)1(,6,152222222babaabbaba求:已知例9.615)()()1(2222abbababa由已知得解:2199))((2121)(6152)2(22222...
