问题
填空题
观察下列各式:a+b=1;a2+b2=3;a3+b3=4;a4+b4=7;a5+b5=11;…;则a10+b10=________.
答案
123
(解法1)由a+b=1;a2+b2=3得ab=-1代入后三个等式中符合,则a10+b10=(a5+b5)2-2a5b5=123.
(解法2)令an=an+bn,易得an+2=an+an+1,从而a6=18,a7=29,a8=47,a9=76,a10=123.
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