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Re:原来是有规律的阿^_^In Reply To:原来是有规律的阿^_^ Posted by:noskill at 2005-03-27 10:12:23 > 把自然数N分解成若干个互不相同的正整数,使乘积最大; > > 由于这种分解的数目是有限的,所以最大积存在; > > 假设最大积的分解为 > > n=a1+a2+a3+...+a[t-2]+a[t-1]+a[t] > > (a1<a2<a3<...<a[t-2]<a[t-1]<a[t]) > > 我们来证明这个数列的一些性质; > > 1.1<a1 > > if a1=1, then a1(=1), a[t] together could be replaced by a[t]+1. > > 2.to all i, a[i+1]-a[i]<=2; > > if some i make a[i+1]-a[i]>=3, > > then a[i],a[i+1] together could be replaced by a[i]+1,a[i+1]-1 together. > > 3. at MOST one i, fits a[i+1]-a[i]=2 > > if i<j and a[i+1]-a[i]=2 and a[j+1]-a[j]=2 then > > a[i],a[j+1] could be replaced by a[i]+1, a[j+1]-1 > > > > 4. a1<=3 > > if a1>=4, then a1,a2 together could be replaced by 2, a1-1, a2-1 together > > 5. if a1=3 and one i fits a[i+1]-a[i]=2 then i must be t-1 > > if i<t-1 then a[i+2] could be replaced by 2, a[i+2]-2 together > > Now, from the five rules above, we could make the mutiple maximum. > > to an N, find the integer k, fits > > A=2+3+4+...+(k-1)+k <= N < A+(k+1)=B > > Suppose N = A + p, (0 <= p < k+1) > > 1) p=0, then answer is Set A > > 2) 1<=p<=k-1 then answer is Set B - { k+1-p } > > 3) p=k, then answer is Set A - {2} + {k+2} > > We can prove this is the best choice with ease, > > as any other choice will lead to at least one of the following: > > 1) a1>=4 or a1=1 > > 2) two a[i+1]-a[i]=1 or one a[i+1]-a[i]=2 > > 3) a1=3 and some i<t-2 fits a[i+1]-a[i]=1 强悍 Followed by: Post your reply here: |
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