已知函数f(x)满足:f(1)=1/4,4f(x)f(y)=f(x+y)+f(x-y)(x、y属于R),求f(2010)值。
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4 f (0) f (0) = 2 f (0)
f (0) = 1/2
4 f (0) f (x) = f (x) + f (x) = 2 f (x)
4 f (x) f (1) = f (x + 1) + f (x - 1)
f (x + 1) = f (x) - f (x - 1)
f (x) = f (x - 1) - f (x - 2)
事实上可以求得通项公式
(1/4)*(1/2+(1/2*I)*sqrt(3))^n+(1/4)*(1/2-(1/2*I)*sqrt(3))^n
解得
f(2010) = 1/2
f (0) = 1/2
4 f (0) f (x) = f (x) + f (x) = 2 f (x)
4 f (x) f (1) = f (x + 1) + f (x - 1)
f (x + 1) = f (x) - f (x - 1)
f (x) = f (x - 1) - f (x - 2)
事实上可以求得通项公式
(1/4)*(1/2+(1/2*I)*sqrt(3))^n+(1/4)*(1/2-(1/2*I)*sqrt(3))^n
解得
f(2010) = 1/2
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将y = 0 带入, 4f(x)f(0)=2f(x)
因为f(x)不可能永远=0,比如x=1时,f(x)不等于0,所以f(0) = 1 /2
将y=1代入, f(x+1) = f(x) - f(x-1)
推出f(2) = f(1)-f(0) = -1/4
f(3) = f(2)-f(1) = -1/2
f(4) = -1/4
f(5) = 1/4
f(6) = 1/2
f(7) = 1/4
看出来f(0)到f(5)为6个数1组,一次类推f(6)到f(11)循环,之后也一直循环下去
2010除6 = 335 正好整除
所以f(2010) = f(6) = f(0) = 1/2
因为f(x)不可能永远=0,比如x=1时,f(x)不等于0,所以f(0) = 1 /2
将y=1代入, f(x+1) = f(x) - f(x-1)
推出f(2) = f(1)-f(0) = -1/4
f(3) = f(2)-f(1) = -1/2
f(4) = -1/4
f(5) = 1/4
f(6) = 1/2
f(7) = 1/4
看出来f(0)到f(5)为6个数1组,一次类推f(6)到f(11)循环,之后也一直循环下去
2010除6 = 335 正好整除
所以f(2010) = f(6) = f(0) = 1/2
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