Write a public static function named power that takes in two integers, a and b, and returns a^ b, the first argument to the power of the second argument. You may NOT use Math.pow(), because that would be boring.
The base case in this method is when the second argument is 0: n^0 = 1, by definition.
Hint: 3^5 = 3*(3^4)
Why is recursion not the best solution for this problem? If you do not know, ask a TA.
Create a similar method named power2 that is functionally identical but does not use recursion. It should still NOT use Math.pow().
fileCount
Write a public static function named fileCount that takes as input a directory (as a File object) and returns the total number of files in all sub-directories
Directories count as files, too.
Your method should look through all files and sub-directories in the directory that was passed in. While searching through the directory, use the java.io.File.isDirectory() method to check if the File you are looking at is a file or directory. If it is a normal file, count it. If it is a directory, count it and use a recursive call to count its contents.
Hint:
What is the base case?
What is the recursive step?
What is the combination?
You should consult the
java.io.File API for more information.
Write a public static function named hanoi that recursively solves the Tower of Hanoi puzzle (see the description below).
Your function should take 1 integer and 3 chars as input (in this order): n, src, dest, aux.
n is the number of disks.
src (source), dest (destination), and aux (auxiliary) are tower letters.
For example, to solve the 3 disk puzzle, you would call hanoi(3,'A','C','B');
hanoi(3,'A','C','B'); means â€œmove 3 disks from tower A to tower C using tower Bâ€
Your function should print the solution to the puzzle to standard output in the following format:
â€œmove [disk] from [tower1] to [tower2]â€
[disk] is the number of the disk being moved. Disks are numbered 1 to n, 1 being the smallest and n being the largest.
[tower1] is the letter of the tower from which the disk is being moved.
[tower2] is the letter of the tower to which the disk is being moved.
For example: â€œmove 1 from A to Câ€ is the first step of solving the 3 disk problem.
Print each step on its own line.
The base case is the 0-disk problem, for which nothing must be done (just return).
What is the recursive step?
What is the combination?
Hints:
Solve the puzzle by hand (
one of many online versions or
another).
Divide and Conquer.
How do you use the solution to the 1-disk problem to help you solve the 2-disk problem?
How about using the 2-disk solution to solve the 3-disk problem?
And so on.
The whole function is just 5 lines of code.
2 of these are the base case
The other 3 are the steps to use the (n-1)-disk solution to solve the n-disk problem.
About the Tower of Hanoi
There is a temple in Kashi Vishwanath which contains a large room with three time-worn posts, on which are stacked 64 golden disks. Brahmin priests, acting out the command of an ancient prophecy, have been moving these disks, in accordance with the immutable rules of the Brahma, since that time. When the last move of the puzzle is completed, the world will end. Despite the location of the legendary temple, the puzzle is most often called the Tower of Hanoi.
The objective of the puzzle is to move the entire stack of disks from the first post to the third post, obeying the following simple rules:
Only one disk may be moved at a time.
Each move consists of taking the upper disk from one of the stacks and placing it on top of another stack.
No disk may be placed on top of a smaller disk.
mysterySeries
Figure out the pattern from the table below.
Write a public static function named mysterySeries that take integers i and j as input and returns the ( i, j)-th mystery number (the number in the i-th row and j-th column).
mysterySeries(6,2) should return 15
Base Cases:
If i < 0 or j < 0 or i < j, then A( i, j) = 0
The above 3 base cases are not sufficient, what other base case(s) do you need?
Hint: Each element of the i-th row can be computed from elements in the ( i-1)-th row.
A(i,j)
0
1
2
3
4
5
6
â€¦
0
1
1
1
1
2
1
2
1
3
1
3
3
1
4
1
4
6
4
1
5
1
5
10
10
5
1
6
1
6
15
20
15
6
1
â€¦
â€¦
â€¦
â€¦
â€¦
â€¦
â€¦
â€¦
â€¦
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