There are two sorted arrays nums1 and nums2 of size m and n respectively. Find the median of the two sorted arrays. The overall run time complexity should be O(log (m+n)).

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 //方法一：归并排序后查找：O((m+n)lg(m+n))，奇怪竟然通过了

 double findMedianSortedArrays(vector<int>& nums1, vector<int>& nums2)

 {

     size_t n1 = nums1.size(), n2 = nums2.size();

     size_t n = n1+n2;

     vector<int> nums(n,);

     assert(n > );

     nums1.push_back(INT_MAX);

     nums2.push_back(INT_MAX);

     size_t i = , j = , k = ;

     while(i < n1 || j < n2) {

         if (nums1[i] <= nums2[j]) {

             nums[k++] = nums1[i++];

         }

         else

             nums[k++] = nums2[j++];

     }

     return ((n%) ? (double)nums[(n-)/]:(double)(nums[(n-)/]+nums[n/])/);

 }

 //方法二：二分法：O(lg(m+n)),满足题目要求

 //get the kth number of two sorted array

 double findkth(vector<int>::iterator a,int m,

                vector<int>::iterator b,int n,

                int k)

 {

     if(m >  n)

         return findkth(b,n,a,m,k);

     if(m == )

         return b[k-];

     if(k == )

         return min(*a,*b);

     int pa = min(k/,m),pb = k - pa;

     if(*(a + pa - ) < *(b + pb -))

         return findkth(a+pa,m-pa,b,n,k-pa);

     else if(*(a + pa -) > *(b + pb -))

         return findkth(a,m,b+pb,n-pb,k-pb);

     else

         return *(a+pa-);

 }

 double findMedianSortedArrays1(vector<int>& nums1, vector<int>& nums2) {

     vector<int>::iterator a = nums1.begin();

     vector<int>::iterator b = nums2.begin();

     int total = nums1.size() + nums2.size();

     // judge the total num of two arrays is odd or even

     if(total & 0x1)

         return findkth(a,nums1.size(),b,nums2.size(),total/+);

     else

         return (findkth(a,nums1.size(),b,nums2.size(),total/) + findkth(a,nums1.size(),b,nums2.size(),total/ + ))/;

 }