Suppose you remove the Jacks, Queens, and Kings from the deck. This leaves you with 40...

Observe that a deck of poker cards consists of 4 aces, 12 face cards (Jacks, Queens,...

Observe that a deck of poker cards consists of 4 aces, 12 face cards (Jacks, Queens, and Kings), and 36 numbered cards (from 2s to 10s). If 10 cards are drawn from a deck of cards (with replacement and reshuffling after each draw), what is the probability that: (a) The 10 cards contain exactly 1 ace, 3 face cards, and 6 numbered cards? (b) The 10 cards contain at least three cards of each type (i.e. aces, face cards, numbered...

A person removes two aces, a king, two queens, and two jacks from a deck of...

A person removes two aces, a king, two queens, and two jacks from a deck of 52 playing cards, and draws, without replacement, two more cards from the deck. Find the probability that the person will draw two aces, two kings, or an ace and a king.

A standard deck consists of 52 cards of which 4 are aces, 4 are kings, and...

A standard deck consists of 52 cards of which 4 are aces, 4 are kings, and 12 (including the four kings) are "face cards" (Jacks, Queens, and Kings). Cards are dealt at random without replacement from a standard deck till all the cards have been dealt. Find the expectation of the following. Each can be done with almost no calculation if you use symmetry. a) The number of aces among the first 5 cards b) The number of face cards...

Five cards are dealt from a standard 52-card deck. What is the probability that the sum...

Five cards are dealt from a standard 52-card deck. What is the probability that the sum of the faces on the five cards is 48 or more? In this case, Jacks, Queens, and Kings count as 0s. So only the number cards Ace (=1) to 10 have numeric face value.

a) Describe an experiments of the drawing of three cards from a deck of cards from...

a) Describe an experiments of the drawing of three cards from a deck of cards from which the jacks, queens and kings have been removed. (Note: these are 52 cards in a deck--13 cards are hearts, 13 cards are diamonds., 13 cards are clubs, and 13 cards are spades. A card with an ace counts as 1. Nine cards of each suit are marked 2 through 10. Ignore the jacks, queens, and kings, leaving 40 cards from which to draw.)...

Suppose you have a 52-card deck. a) what is the probability of selecting two kings from...

Suppose you have a 52-card deck. a) what is the probability of selecting two kings from the deck? b) what is the probability of selecting two queens c) what is the probability of selecting a king, and then and ace, and then a ten?

Suppose we draw two cards out of a deck of 52 cards. If the two cards...

Suppose we draw two cards out of a deck of 52 cards. If the two cards make a pair of “face” cards (jacks, queens, or kings), you collect $200; if they makes a pair of aces, you collect an amazing $1,000; if they make a pair but not a pair of face cards or aces, you collect $100; otherwise you lose $13. In terms of profits and statistics, should you play the game? Why or why not?

A deck of playing cards has 52 cards. There are four suits (clubs, spades, hearts, and...

A deck of playing cards has 52 cards. There are four suits (clubs, spades, hearts, and diamonds). Each suit has 13 cards. Jacks, Queens, and Kings are called picture cards. Suppose you select three cards from the deck without replacement. a. Find the probability of getting a heart only on your second card. Round answer to three decimal places b Find the probability of selecting a Jack and a heart . Round answer to three decimal places. c. Find the...

Suppose that we draw two cards from a standard deck of 52 playing cards, where ace,...

Suppose that we draw two cards from a standard deck of 52 playing cards, where ace, 2, 3, 4, 5, 6, 7, 8, 9, 10, jack, queen and king each appear four times (once in each suit). Suppose that it is equally likely that we draw any card remaining in the deck. Let X be the value of the first card, where we count aces as 1, jacks as 11, queens as 12, and kings as 13. Let Y be...

If you are dealing from a standard deck of 52 cards a) how many different 4-card...

If you are dealing from a standard deck of 52 cards a) how many different 4-card hands could have at least one card from each suit? b)how many different 5-card hands could have at least one spade? c) how many different 5-card hands could have at least two face cards (jacks, queens or kings)?