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ICS 6D Homework 5
Leave your answer for the questions below as an arithmetic expression, including the P(n, k) or n k notation. You do not have to compute a final numeric value.
1. Consider the following definitions for sets of characters:
• Symbols = {∗, &, $, #}
• Digits = {0, 1, 2, 3, 4, 5, 6, 7, 8, 9}
• Letters = {a, b, c, d, e, f, g, h, i, j, k, l, m, n, o, p, q, r, s, t, u, v, w, x, y, z}
How many passwords that satisfy each set of constraints:
(a) Strings of length 6. Characters can be symbols, digits, or letters, with no restrictions.
(b) Strings of length 7, 8, or 9. Characters can be symbols, digits, or letters, with no restrictions.
(c) Strings of length 7, 8, or 9. Characters can be symbols, digits, or letters. The first symbol can not be a letter.
(d) Strings of length 6. Characters can be symbols, digits, or letters, with no repeated characters.
(e) Strings of length 6. Characters can be symbols, digits, or letters, with no repeated characters. The first symbol can not be a symbol.
2. If x is a string then x R is the reverse of the string. For example, if x = 1011, then x R = 1101. A string is a palindrome if it the same backwards and forwards (i.e. if x = x R). Let B = {0, 1}. Let Pn be the set of all stings in Bn that are palindromes.
(a) Show a bijection between P6 and B3 .
(b) What is |P6|?
(c) Determine the cardinality of P7 by showing a bijection between P7 and Bn for some n.
3. Define T = {0, 1, 2}. A string x ∈ T n is said to be balanced if the sum of the digits is equivalent to 0 mod 3.
(a) Show a bijection between the strings in T 6 that are balanced and T 5 .
(b) How many strings in T 6 are balanced?
4. Ten members of a wedding party are lining up in a row for a photograph.
(a) How many ways are there to line up the ten people?
(b) How many ways are there to line up the ten people if the groom must be to the immediate left of the bride in the photo?
(c) How many ways are there to line up the ten people if the goom must be next to the bride (either on her left o ight side)?
5. There are 20 members of a basketball team.
(a) The coach must select 12 players to travel to an away game. How many ways are there to select the players who will travel 2
(b) From the 12 players who will travel, the coach must select her starting line up. She will select a player for each of the five positions: center, right forward, left forward, right guard, left guard. How many ways are there for her to select the starting line-up?
(c) From the 12 players who will travel, the coach must select her starting line up. She will select a player for each of the five positions: center, right forward, left forward, right guard, left guard. However, there are only three of the 12 players who can play center. Otherwise, there are no restrictions. How many ways are there for her to select the starting line-up?
6. There are 30 boys and 35 girls that try out for a chorus. The choir director will select 10 girls and 10 boys from the kids trying out. How many ways are there for the choir director to make his selection?
7. This question refers to a standard deck of playing cards. If you are unfamiliar with playing cards, there is an explanation in Section 11.1 of your text under the heading ”Standard playing cards”. A five-card hand is just a subset of 5 cards from a deck of 52 cards.
(a) How many different five-card hands are there from a standard deck of 52 playing cards?
(b) How many five-card hands have exactly two hearts?
(c) How many five-card hands are made entirely of hearts and diamonds?
(d) How many five-card hands have four cards of the same rank?
(e) A ”full house” is a five-card hand that has two cards of the same rank and three cards of the same rank. For example, {queen of hearts, queen of spades, 8 of diamonds, 8 of spades, 8 of clubs}.
(f) How many five-card hands do not have any two cards of the same rank.
8. A teacher has five books to distribute to some of 20 kids in her class.
• How many ways are there for her to distribute the books if they are all the same and no kid gets more than one?
• How many ways are there fore her to distribute the books if they are different and no kid gets more than one? So, if Charlie gets ”Green Eggs and Ham” and Amanda gets ”The Cat in the Hat” that is a different way of distributing the books than if Amanda gets ”Green Eggs and Ham” and Charlie gets ”The Cat in the Hat”.
• How many ways are there to distribute the books if the books are all different and there is no restriction on the number of books that can be given to any kid.