you have a 1 in 6 chance of rolling a 6.
you have a 1 in 13 chance to draw a 10 (there are 4 tens in a pack of 52: thus 52/4 = 13)
(1/6)*(1/13)*100 = 1.282 % of drawing a ten and rolling a 6 at the same time
On a random draw of a single card, the probability is 3/4.
There are 4 kings and 52 cards so the probability of drawing a king are 4/52 or 2/26.
What is the probability of drawing a heart or a king in a regular deck of playing cards? Show work or explain answer.
(question not clear) , as far to my understanding it is 4 over 52 simplified , so answer is = 1 over 13. (probability of a king drawn from a pack of cards)
Aprox. 0.018%There are 4 queens in a regular deck of 52 cards.The probability of drawing a queen on the first draw is: P(Q1) = 4/52.The probability of drawing a queen on the second draw given that the first card wasa queen is: P(Q2│Q1) = 3/51.The probability of drawing a queen on the third draw given that the first two cardswere queens is: P(Q3│(Q2UQ1)) = 2/50.The probability of drawing 3 queens on the first 3 cards drawn from a deck of cardsis: P(Q1UQ2UQ3) = (4/52)∙(3/51)∙(2/50) = 1.80995... x 10-4 ≈ 0.00018 ≈ 0.018%
On a random draw of a single card, the probability is 3/4.
It is 1/13.
The probability of drawing a king of hearts from a regular deck of cards is 1 in 52 because there is only one king of hearts in the standard 52 card deck.
1 in 52
4 in 52, or 1 in 13
7/26
The probability is 11/13.
There are 4 kings and 52 cards so the probability of drawing a king are 4/52 or 2/26.
What is the probability of drawing a heart or a king in a regular deck of playing cards? Show work or explain answer.
The probability of A is denoted P(A) and the probability of B is denoted P(B). P(A or B) = P(A) + P(B) - P(A and B). Say P(A) = Probability of drawing a heart, which is 13/52. Say P(B) = Probability of drawing a three, which is 4/52. We now have to determine P(A and B) which is the probability of a heart and a three, which is 1/52. We now can determine the probability of drawing a heart or a three which is 13/52 + 4/52 - 1/52 = 16/52 = 4/13.
The probability of rolling any single number of a regular die on one roll is one in six, or 1/6, or 0.166666....
There are 13 Hearts (including a King) and 3 extra Kings (a total of 16 cards) in the 52 card pack, so the probability of drawing a Heart or a King is 16/52 = 4/13 = 0.3077 or 30.77%