Rikka is a high school girl suffering seriously from Chu ̄niby ̄o (the age of fourteen would either act like a know-it-all adult, or thinks they have special powers no one else has. You might google it for detailed explanation) who, unfortunately, performs badly at math courses. After scoring so poorly on her maths test, she is faced with the situation that her club would be disband if her scores keeps low. Believe it or not, in the next exam she faces a hard problem described as follows. Let’s denote f(x) number of ordered pairs satisfying (a ∗ b)|x (that is, x mod (a ∗ b) = 0) where a and b are positive integers. Given a positive integer n, Rikka is required to solve for f(1)+f(2)+...+f(n). According to story development we know that Rikka scores slightly higher than average, meaning she must have solved this problem. So, how does she manage to do so? Input There are several test cases. For each test case, there is a single line containing only one integer n (1 ≤ n ≤ 1011). Input is terminated by EOF. Output For each test case, output one line ‘Case X: and Y is the desired answer. Sample Input 1 3 6 10 15 21 28 Sample Output Case 1: 1 Case 2: 7 Case 3: 25 Case 4: 53 Case 5: 95 Case 6: 161 Case 7: 246 Y ’ where X is the test case number (starting from 1)