Since,the cards are drawn without replacement so, the probability of drawing a king in each trial keeps on changing so, one can't use binomial distribution as the probability of success is not remain constant here, and we know that for binomial distribution each trials should have two outcomes results in success and falur and the probability of each success should be constant which is not seen here.
So, option 2nd is correct.
Sive Answer 29/1 points Consider the following experiment. You have a deck of 52 playing cards,...
The following question involves a standard deck of 52 playing cards. In such a deck of cards there are four suits of 13 cards each. The four suits are: hearts, diamonds, clubs, and spades. The 26 cards included in hearts and diamonds are red. The 26 cards included in clubs and spades are black. The 13 cards in each suit are: 2, 3, 4, 5, 6, 7, 8, 9, 10, Jack, Queen, King, and Ace. This means there are four...
13. [3] You shuffle a deck of playing cards and the chance you get a diamond card is 0.25. You repeat this process 200 times, putting the card back each time, and out of those 200 attempts you get 57 diamond cards. This demonstrates a. The law of large numbers b. The law of averages 14. [3] You shuffle a deck of playing cards and the chance you get a diamond card is 0.25. You repeat this process times, putting...
DETAILS BBBASICSTATBACC 5.2.023. 10. (1.47/5.88 Points) You draw two cards from a standard deck of 52 cards, but before you draw the second card, you put the first one back and reshuffle the deck. (a) Are the outcomes on the two cards independent? Why? No. The probability of drawing a specific second card depends on the identity of the first card. Yes. The probability of drawing a specific second card is the same regardless of the identity of the first...
A random experiment consists of drawing a card from an ordinary deck of 52 playing cards. Let the probability set function P assign a probability of 1 52 to each of the 52 possible outcomes. Let C1 denote the collection of the red cards (hearts and diamonds) and let C2 denote the collection of the 4 kings plus the 4 aces. Compute P(C1), P(C2), P(C1 ∩C2), and P(C1 ∪C2).
Draw 3 cards simultaneously from a standard deck of 52 playing cards. Then find: 1. Probably of observing all cards of the same face value 2. Probability of observing all cards of different face values 3. Probability of observing at least one king 4. Probability of observing exactly one diamond 5. Probability that two cards are kings and the other one is a diamond
Consider a standard 52-card deck of cards. In particular (for those unfamiliar with playing cards), the deck contains 4 aces, 4 kings, 4 queens, 4 Jacks, 4 10's, 4 94, 4 84, 4 7's, 4 6's, 4 5's, 4 4's, 4 3, and 4 2's, where for each type of card (for example ace), one of the 4 copies is of suit club, one is of suit heart, one is of suit spade, and one is of suit diamond. Consider...
Version 1 Algebra 2 paces provided. (2 points) A standard deck of playing cards is comprised of 52 cards, Ace through King for each of the four suit pattens. Kings, Queens, and Jacks are considered face-cards. Using complements, find the probability of not choosing a face-card from a standard deck of cards. 8
3. You have a standard deck of 52 playing cards. There are two colors (black and red) and four suits (spades are black, clubs are black, hearts are red, and diamonds are red). Each suit has 13 cards, in which there is an ace, numbered cards from 2 to 10, and three face cards (jack, queen, and king) a. You randomly draw and then replace a card. What's the probability it's an ace? What's the probability it's the 4 of...
you are dealt 2 cards successively (without replacement) from a shuffled deck of 52 playing cards. Find the probability that the first card is a king and the second card is a queen.
2. Consider a standard 52 card deck of playing cards. In total there are four cards that are Aces, four cards that are Kings, four cards that are Queens and four cards that are Jacks. The remaining 36 cards are four each of the numbers 2, 310. That is there are four cards that are twos, four cards that are threes etc. For this question, suppose that we reduce the number of cards in the deck by removing one of...