For the second question here are the answers:
a) We need to find the different 5 number sequences.
Since the digits can be selected randomly from any of the range 0-9 and there is no restriction on the repetition of the digits in the ticket number we can have sequences starting from 00000 to 99999 which means the different sequences are:
105 = 100,000
b) The number of different lottery tickets that can be chosen where the first three digits are fixed will be:
13 * 102 = 100. Again we don't have any restrictions on the repetition of the digits in any of the places in the tickets
c) The probability that the first three numbers of the winning lottery ticket are 0, 3, 4 is:
1/10 * 1/10 * 1/10 = 1/1000 = 0.001 or 0.1%
Since the probability of any digit being selected from the random number generator is 1/10 and we need to fix the selection of the first three digits.
please explain and show work for the parts I missed 1) You decide to play a...
How many different 5 card hands can be dealt from a deck of 52 cards? Answer: possible hands How many different 5 card hands can be dealt from a deck of 52 cards if all five of these cards are clubs? Answer: possible hands How many different 5 card hands can be dealt from a deck of 52 cards if the hand consists of exactly 2 aces? Answer: possible hands How many different 5 card hands can be dealt from...
please explain and thank you! 3. (From Handout 3 - Slide 26). Poker: (a) How many 5 card hands may be dealt from a deck of 52 cards? (b) What is the probability of being dealt 3 of a kind in poker? (c) What is the probability of being dealt a full house in poker? (2 of one denomination and 3 of another)
26. -12 points v From a standard 52-card deck, how many 5-card poker hands can be dealt consisting of the following cards? (a) Five clubs poker hands (b) Three kings and one pair poker hands
I am having problem understanding this problem. please explain it explicitly. its a discrete computer science problem. thanks Exercises 27-32 concern a 5-card hand from a standard 52-card deck. A standard deck has 13 cards from each of 4 suits (clubs, diamonds, hearts, spades). The 13 cards have face value 2 through10, jack, queen, king, or ace Each face value is a "kind" of card. The jack, queen, and king are "face cards. 27. How many hands contain 4 queens?...
just (xiii)thanks (xi) How many different 5-card poker hands can be dealt from a regular 52-card (xii) How many of these hands contain no aces? (xii) How many contain a aces, for a-0 to 4? (xiv) How many contain all cards of the same suit? deck?
just xiii thanks (xi) How many different 5-card poker hands can be dealt from a regular 52-card (xii) How many of these hands contain no aces? (xii) How many contain a aces, for a-0 to 4? (xiv) How many contain all cards of the same suit? deck?
2. A hand of 5-card draw poker is a simple random sample from the standard deck of 52 cards. How many 5 draw poker hands are there? In 5-card stud poker, the cards are dealt sequentially and the order of appearance is important. How many 5-stud poker hands are there? 3. How many hands of 5-draw poker contain the ace of hearts? What is the probability that a 5-card draw hand contains the ace of hearts?
2. A hand of 5-card draw poker is a simple random sample from the standard deck of 52 cards. How many 5 draw poker hands are there? In 5-card stud poker, the cards are dealt sequentially and the order of appearance is important. How many 5-stud poker hands are there? 3. How many hands of 5-draw poker contain the ace of hearts? What is the probability that a 5-card draw hand contains the ace of hearts?
May i please get help with this? Thank you for your time. [Poker] Poker is a card played with a standard 52 card playing deck (https://en.wikipedia.org/wiki/Standard_52-card_deck). There are many variants of poker. However, for this problem we will not concern ourselves with any specific version, but rather the types of poker hands possible. Assume five cards out of the standard 52 card deck are dealt to a player. The order that the player receives the cards does not matter. One...
discrete structure Recall that a standard deck of 52 cards has 4 suits (hearts, diamonds, spades, and clubs), each of which has 13 ranks: 2-10, Jack, Queen, King, and Ace (in order from lowest to highest). Order of cards in a hand does not matter (a) (10 points) A full house is 3 cards of one rank and 2 of another rank. How many full houses are there in a 5-card hand if either the pair or the 3 of...