Suppose that we distribute 4 identical balls into 11 buckets labeled 1 through 11. Distributions will...

Probability question: The number of ways to distribute 11 identical balls into 4 distinct boxes such...

Probability question: The number of ways to distribute 11 identical balls into 4 distinct boxes such that Box 1 has at most 3 balls and Box 2 has at most 2 balls is?

1. I have a pile of n identical ping-pong balls and two boxes, labelled Box 1...

1. I have a pile of n identical ping-pong balls and two boxes, labelled Box 1 and Box 2. How many different ways are there to distribute the n balls into the two boxes? Explain why your answer is correct. 2. How many ways are there to distribute n ping-pong balls among k boxes? 3. I have n books with n different titles. I want to put them on shelves in my library. How many different ways are there to...

How many ways can we put 10 identical red balls and 10 identical blue balls into...

How many ways can we put 10 identical red balls and 10 identical blue balls into 4 distinct urns such that: there is no constraint?    first urn has at least 1 red ball and 2 blue balls? each urn has at least 1 ball? (hint: inclusion-exclusion principle)

A box contains 11 balls numbered 1 through 11. Two balls are drawn in succession without...

A box contains 11 balls numbered 1 through 11. Two balls are drawn in succession without replacement. If the second ball has the number 4 on​ it, what is the probability that the first ball had a smaller number on​ it? An even number on​ it? The probability that the first ball had a smaller number is _____. ​(Type a fraction. Simplify your​ answer.) The probability that the first ball had an even number is ____. ​(Type a fraction. Simplify...

We are given n distinct balls and m distinct boxes. m and n are non-negative integers....

We are given n distinct balls and m distinct boxes. m and n are non-negative integers. Every ball must be placed into a box, but not every box must have a ball in it. Each box can hold any number of balls. Let's also assume that the order in which we put the balls into the boxes does matter. (Ex: assume we have 2 balls, a and b, and 3 boxes, 1 2 and 3. two distinct distributions would be...

Exercise 2.19. We have an urn with balls labeled 1,..., 7. Two balls are drawn. Let...

Exercise 2.19. We have an urn with balls labeled 1,..., 7. Two balls are drawn. Let X1 be the number of the first ball drawn and X2 the number of the second ball drawn. By counting favorable outcomes, compute the probabilities P(X 1 = 4), P(X2 = 5), and P(X1 = 4,X 2 = 5) in cases (a) and (b) below. (a) Write down a precise sum expression for the probability that the first five rolls give a three at...

20. There are 252 identical plastic chips numbered 1 through 252 in a box. What is...

20. There are 252 identical plastic chips numbered 1 through 252 in a box. What is the probability of reaching into the box and randomly drawing the chip numbered 81? Express your answer as a simplified fraction or a decimal rounded to four decimal places. 30. Customer account "numbers" for a certain company consist of 2 letters followed by 4 numbers. Step 1 of 2: How many different account numbers are possible if repetitions of letters and digits are allowed?...

1. Consider a 45-ball lottery game. In total there are 45 balls numbered 1 through to...

1. Consider a 45-ball lottery game. In total there are 45 balls numbered 1 through to 45 inclusive. 4 balls are drawn (chosen randomly), one at a time, without replacement (so that a ball cannot be chosen more than once). To win the grand prize, a lottery player must have the same numbers selected as those that are drawn. Order of the numbers is not important so that if a lottery player has chosen the combination 1, 2, 3, 4...

1. Consider a carton containing one dozen colorfully decorated eggs labeled A through L. ’ (a)...

1. Consider a carton containing one dozen colorfully decorated eggs labeled A through L. ’ (a) How many distinct ways can the eggs be arranged in the carton? (b) If three of the eggs are chosen to decorate an Easter basket, how many choices are possible? Hint: Order doesn’t matter. (c) What is the probability that exactly 3 of the randomly chosen eggs have a vowel for a label? Hints: How many vowels are there between A and L? Since...

Evaluate C(11,4). C(11,4) equals = Six cards are marked with the numbers 1, 2, 3, 4,...

Evaluate C(11,4). C(11,4) equals = Six cards are marked with the numbers 1, 2, 3, 4, 5, and 6 , then shuffled, and three cards are drawn. a. How many different three -card combinations are possible? b. How many three -card hands contain a number less than three? Use a tree diagram for the following. a. Find the number of ways 2 letters can be chosen from the set {U, V, W, X} if order is important and repetition is...