Discrete Distributions Part 1: Binomial Probability Distribution Binomial Probability Function: Questions: f (X) = (C3?) px(1 - 1300\") f(x) = the probability of X success in n trials x = the number of successes (only two possible outcomes: success and failure) 1) = the probability of success of one trial (constant for all trials) 71 = the number of trials (all trials are identical and independent) (C E) = combinatorial equation 15. Which are the parameters of this distribution function? (There are two.) 16. A university found that 10% of students withdraw from a math course. Assume 25 students are enrolled. a) bi C) dl Write the prob. distribution function with the specific parameters for this problem. Compute by hand (can use calculator but show some work) the prob. that exactly 2 withdraw. Compute by hand (can use calculator but show some work) the prob. that exactly 5 withdraw. Construct the probability distribution table of class withdrawals in Excel. This is a table of x and x). Generate one column for the number of x successes with numbers 0 to 25 in each row. Generate a second column with the probability x) of each success using the Excel function =BINOM.DIST(X, n, p, FALSE) in each row. Attach the table to the end of your homework. What is the probability that 5 or less will withdraw