Q: What is the probability of not choosing a red or black card from a standard deck of 52 playing cards?

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The probability of choosing a red or black card from a standard deck of 52 cards is 52 in 52, or 1 in 1. In other words, it will happen no matter what.

The probability is 1. It must be "a red or black card".

The probability of drawing a red or black card from a standard deck of playing cards is 1 (a certainty). This is because these are the only options available.

Excluding jokers, the probability is 1 in 2.

It is 2/52 or 1/26.

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The probability of choosing a red or black card from a standard deck of 52 cards is 52 in 52, or 1 in 1. In other words, it will happen no matter what.

The probability is 1. It must be "a red or black card".

The probability of drawing a red or black card from a standard deck of playing cards is 1 (a certainty). This is because these are the only options available.

The probability, or probility, even, is 0 since tere can be no such thing as "choosing red card of the black".

Excluding jokers, the probability is 1 in 2.

It is 2/52 or 1/26.

Probability of drawing a black 7 from a standard 52-card deck is 2/52 or 1/26.

There are two black 7's and two red queen's in a standard deck of playing cards. The probability of drawing a black 7 is 2 in 52, or 1 in 26, or about 0.038. The probability of drawing a red queen from the remaining 51 cards is 2 in 51, or about 0.039. The probability, then, or drawing a black 7 followed by a red queen is (2 in 52) times (2 in 51), which is 4 in 2652, or 2 in 1326, or about 0.00151.

The probability of drawing a black 8 from a standard deck of 52 card is 2 in 52 or 1 in 26 or about 0.03846.

there is a 50% probability that you will pick a black card out of a full pack of playing cards

The Probability of Success = Number of successful outcomes/Number of outcomes.E.g. Find the probability of choosing a red five or a black odd numbered card in a standard deck of 52 playing cards.There are 2 red fives and 10 odd numbered cards, and a total of 52 cards, so:=2/52+10/52=12/523/13Probability of Red 5 or a Black Odd = 3/13* * * * *The above is true only for discrete distributions, not for continuous variables. For a continuous variable, with probability distribution function p(x), the probability that x lies between two values, a and b (ie a

The probability of picking a black ace in one random draw from a normal pack of playing cards is 1/26.