What is the probability of drawing a black card from a well-shuffled deck of 52 cards?

Last Updated : 23 Jul, 2025

Answer: Therefore probability of getting a black card= {total number of black cards in the deck}/{total number of cards in the deck}= 26/52= 1/2

A branch of mathematics that deals with the happening of a random event is termed probability. It is used in Maths to predict how likely events are to happen. The probability of any event can only be between 0 and 1 and it can also be written in the form of a percentage.

The probability of event A is generally written as P(A). Here, P represents the possibility and A represents the event. It states how likely an event is about to happen. The probability of an event can exist only between 0 and 1 where 0 indicates that event is not going to happen i.e. Impossibility and 1 indicates that it is going to happen for sure i.e. Certainty.

If not sure about the outcome of an event, take help of the probabilities of certain outcomes, how likely they occur. For a proper understanding of probability, take an example as tossing a coin, there will be two possible outcomes - heads or tails.

Formula of Probability

Probability of an event, P(A) = Favorable outcomes / Total number of outcomes

Some Terms of Probability Theory

There are different terms used in the probability that are not commonly used normally, terms like experiments, sample space, a favorable outcome, trial, random experiment, etc. Let's take a look at their definitions in detail,

Experiment: An operation or trial done to produce an outcome is called an experiment.
Sample Space: An experiment together constitutes a sample space for all the possible outcomes. For example, the sample space of tossing a coin is head and tail.
Favorable Outcome: An event that has produced the required result is called a favorable outcome. For example, If two dice are rolled at the same time then the possible or favorable outcomes of getting the sum of numbers on the two dice as 4 are (1, 3), (2, 2), and (3, 1).
Trial: A trial means doing a random experiment.
Random Experiment: A random experiment is an experiment that has a well-defined set of outcomes. For example, when a coin is tossed, a head or tail is obtained but the outcome is not sure that which one will appear.
Event: An event is the outcome of a random experiment.
Equally Likely Events: Equally likely events are rare events that have the same chances or probability of occurring. Here The outcome of one event is independent of the other. For instance, when a coin is tossed, there are equal chances of getting a head or a tail.
Exhaustive Events: An exhaustive event is when the set of all outcomes of an experiment is equal to the sample space.
Mutually Exclusive Events: Events that cannot happen simultaneously are called mutually exclusive events. For example, the climate can be either cold or hot. One cannot experience the same weather again and again.

The Possibility of only two outcomes which is an event will occur or not, like a person will eat or not eat the food, buying a bike or not buying a bike, etc. are examples of complementary events.

Some Probability Formulae

Addition rule: Union of two events, say A and B, then,

P(A or B) = P(A) + P(B) - P(A∩B)
P(A∪ B) = P(A) + P(B) - P(A∩B)

Complementary rule: If there are two possible events of an experiment so the probability of one event will be the Complement of another event. For example, if A and B are two possible events, then,

P(B) = 1 - P(A) or P(A') = 1 - P(A).
P(A) + P(A′) = 1.

Conditional rule: When the probability of an event is given and the second is required for which first is given, then P(B, given A) = P(A and B), P(A, given B). It can be vice versa,

P(B∣A) = P(A∩B)/P(A)

Multiplication rule: Intersection of two other events i.e. events A and B need to occur simultaneously. Then

P(A and B) = P(A)⋅P(B).
P(A∩B) = P(A)⋅P(B∣A)