Homework 4 Revision 1

Due: June 6, 2024; late due date is June 11
Points: 100


1. In problem 1, if the square is occupied, you need to give the error message. “%c has played %d,%d\n” (where “%c” is either “X” or “O”, whichever is already in the square, and “%d,%d” are the co-ordinates of the occupied square).
2. In problem 1, the dimensions of the “O” was added; it is to be 5 × 5 centered in the square.
3. For all problems, the exit status code is 0.

  1. (25 points) Enhance the tic-tac-toe game so 2 people can play. To do this, you need to add an“O” that, like the “X”, is drawn in the square. Then prompt the user for a square identifier, and alternate between drawing “X”s and “O”s at those locations on the board. The first move is for “X”. You need to detect and reject when a user plays a square that is already taken. Stop after the board is full (that is, 9 plays). You do not have to worry about who wins.

    The “O” is to be 5 × 5, centered in the middle of the square.

    Here are the messages your program should print to the standard output:

    Here are the error messages; all are to be printed on the standard error:

    If the program reads an end of file at the prompt, print a newline and quit.

    The program should exit with an exit status code of 0.

    Please call your program ttt4a.c and submit it through Gradescope. A sample executable, used to generate the Gradescope validation outputs, is available on the CSIF at /home/bishop/hw4/ttt4a.

  2. (25 points) Now enhance what you did for question 1. Have your program determine when the game is over — that is, there is a winner (three in a row, column, or diagonal) or a tie (no winner and all 9 squares on the board are full). Print the results on the standard output:

    Please call your program ttt4b.c and submit it through Gradescope. A sample executable, used to generate the Gradescope validation outputs, is available on the CSIF at /home/bishop/hw4/ttt4b.

  3. (50 points) The birthday problem asks how many people must be in a room so that the probability of two of them having the same birthday is 0.5. This problem has you explore it by simulation. Basically, you will create a series of lists of random numbers of length n = 2, …, and look for duplicates. You will do this 5000 times for each length. For each length, count the number of lists with at least 1 duplicate number; then divide that number by 5000. That is the (simulated) probability that a list of n generated numbers has at least one duplicate. As the random numbers you generate are between 1 and 365 (each one corresponding to a day of the year), this simulates the birthday problem.

    Now, breathe deeply and calm down. We will do this in steps; you only have to turn the final program in to Canvas (not Gradescope).

    1. First, detecting duplicates. Write a function called hasduplicates(bday) that takes an array bday and returns 1 if it contains a duplicate element, and 0 if it does not. For example, if bday is
      
      int bday[] = { 1, 2, 3, 4, 5, 5, 2 };
      
      then hasduplicates(bday) returns 1 and if
      
      int bday[] = { 1, 2, 3, 4, 5, 6, 7 };
      
      then hasduplicates(bday) returns 0.

    2. Now, deal with one set of birthdays. Write a function called onetest(count) that generates a list of count random integers between 1 and 365 inclusive, and returns 1 if it contains a duplicate element, and 0 if it does not. Please use the function hasduplicates(bday) to test for duplicates.

    3. Now for the probability for count people. Write a function probab(count, num) that runs num tests of count people, and counts the number of tests with duplicates. It returns the fraction of the tests with duplicates; that is, the number of duplicates divided by num.

    4. Now for the demonstration. Start with 2 people, and begin adding people until the probability of that many people having two people with a birthday in common is over 0.5. (In other words, start with a list of 2 elements, and increase the number of elements in the list until the simulation shows a probability of 0.5 that a number in the list is duplicated.) Print each probability; your output should look like this:
      
      For  2 people, the probability of 2 birthdays in common is 0.001400
      For  3 people, the probability of 2 birthdays in common is 0.006600
      For  4 people, the probability of 2 birthdays in common is 0.015200
      For  5 people, the probability of 2 birthdays in common is 0.025400
      For  6 people, the probability of 2 birthdays in common is 0.041400
      For  7 people, the probability of 2 birthdays in common is 0.053000
      For  8 people, the probability of 2 birthdays in common is 0.082000
      For  9 people, the probability of 2 birthdays in common is 0.092200
      For 10 people, the probability of 2 birthdays in common is 0.121800
      
      Hint: Don’t be surprised if your probabilities are slightly different than the ones shown in the sample output. As randomness is involved, it is very unlikely your numbers will match the ones shown here.

    To turn in: Please call your program bday.c and submit it through Canvas (not Gradescope). A sample executable is available on the CSIF at /home/bishop/hw4/ttt4b.


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Matt Bishop
Office: 2209 Watershed Sciences
Phone: +1 (530) 752-8060
Email: [email protected]
ECS 36A, Programming & Problem Solving
Version of May 30, 2024 at 3:58PM

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