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1.1.26
public class TestApp { public static void main(String[] args) { int a = StdIn.readInt(); int b = StdIn.readInt(); int c = StdIn.readInt(); int t; if( a > b) { t = a; a = b; b = t; } if( a > c) { t = a; a = c; c = t; } if( b > c) { t = b; b = c; c = t; } StdOut.println(a + "->" + b + "->" + c); } }
1.1.27
public class Binomial { /** * 递归方式的二项分布 * @param N 总次数 * @param k 出现次数 * @param p 每次出现概率 * @return */ public static double binomial1(int N, int k, double p) { if(N == 0 && k == 0) return 1.0; if(N < 0 || k < 0) return 0.0; return (1.0 - p) * binomial1(N - 1, k, p) + p * binomial1(N - 1, k - 1, p); } public static double binomial2(int N, int k, double p) { double[][] b = new double[N + 1][N + 1]; // base for(int i = 0; i <= N; i++) { b[i][0] = Math.pow(1.0 - p, i); } b[0][0] = 1.0; // recursive for(int i = 1; i <= N; i++) { for(int j = 1; j <=k; j++) { b[i][j] = p * b[i - 1][j - 1] + (1.0 - p) * b[i - 1][j]; } } return b[N][k]; } public static void main(String[] args) { int N = 100; int k = 50; double p = 0.76; StdOut.println(binomial1(N, k, p)); StdOut.println(binomial2(N, k, p)); } }
1.1.28
想不出与BinarySearch有关的去重方法。
1.1.29
// returns the number of elements that are smaller than the key public static int rank(int key, int[] a) { int lo = 0; int hi = a.length - 1; while(lo <= hi) { int mid = (lo + hi) / 2; if(key < a[mid]) hi = mid - 1; else if(key > a[mid]) lo = mid + 1; else { while(a[mid - 1] == key) { mid -= 1; } return mid; } } return -1; } // returns the number of elements equal to the key public static int count(int key, int[] a) { int lo = 0; int hi = a.length - 1; while(lo <= hi) { int mid = (lo + hi) / 2; if(key < a[mid]) hi = mid - 1; else if(key > a[mid]) lo = mid + 1; else { lo = mid; hi = mid; while(a[lo - 1] == key) { lo -= 1; } while(a[hi + 1] == key) { hi += 1; } return hi - lo + 1; } } return 0; }