Popular lifehacks

What is the probability of drawing either a king or a queen from a deck of playing cards?

What is the probability of drawing either a king or a queen from a deck of playing cards?

213
As we all know that the deck of cards has four sets of each card. Therefore there are four kings and four queens are there in a deck. Therefore the probability that a card drawn is either king or queen is213.

What is the probability of drawing a king and a queen consecutively from a deck of 52 cards without?

First, the probability of drawing a king at the first draw is 4/52=1/13. Conditionally on a king being drawn on the first draw, the probability of drawing a queen at the second draw is 4/51. Therefore, probability of drawing sequence KQ is 1/13*(4/51)=4/663.

READ ALSO:   Why do I feel dizzy after eating potato?

What is the probability of randomly drawing a queen or a face from a standard deck of cards?

To find the P(QQQ), we find the probability of drawing the first queen which is 4/52. The probability of drawing the second queen is also 4/52 and the third is 4/52. We multiply these three individual probabilities together to get P(QQQ) = P(Q)P(Q)P(Q) = (4/52)(4/52)(4/52) = .

What is the probability of getting a queen and a king?

Number of favourable outcomes i.e. ‘a king or a queen’ is 4 + 4 = 8 out of 52 cards.

What is the probability of drawing either an ace or a king in a single draw from a deck of 52 playing cards?

There are 4 kings in a deck (one for each suit). Similarly, there are 4 aces in a deck (one for each suit). So, there are 8 kings and aces in a 52-card deck of cards. So, the probability of drawing a king or an ace in a 52-card deck is 8/52 = 2/13.

What is the probability of a king or a queen?

READ ALSO:   What altitude is the flare mode automatically activated on CEO aircraft?

Hence the probability of getting a king or a queen out of 52 cards is 2/13.

What is the probability of getting a queen or king?

The chances of getting a Queen is 4/52 and the chances of getting a King is 4/52. This makes the chance of having both 16/(52∗52) = 16/2704.