Question

The probability expressions refer to drawing a card from a standard deck of cards. State in words the meaning of the expression and give the probability as a fraction. \(P(\) King \(\mid\) Red \()\)

Short answer

Answer: The probability of drawing a King given that the card is Red is 1/13.

Step-by-step solution

Understand the meaning of the expression

The given expression, \(P(\) King \(\mid\) Red \()\), represents the probability of drawing a King from a standard deck of cards, given that the card is already Red. This means that we are considering a situation where we already know that the card drawn is Red, and we want to calculate the likelihood that this Red card is a King.

Determine the total number of Red cards and the number of Red Kings

In a standard deck of 52 cards, there are 2 suits with Red cards: Hearts and Diamonds. Each suit has 13 cards, so there are a total of 26 Red cards. Among these 26 Red cards, there is one King of Hearts and one King of Diamonds, resulting in a total of 2 Red Kings.

Calculate the probability as a fraction

To calculate the probability of drawing a King given that the card is Red, we need to divide the number of Red Kings by the total number of Red cards. So, the probability is: \(P(\) King \(\mid\) Red \()= \frac{\text{number of Red Kings}}{\text{total number of Red cards}}\) Plugging in the numbers, we get: \(P(\) King \(\mid\) Red \() = \frac{2}{26}\) Simplify the fraction: \(P(\) King \(\mid\) Red \() = \frac{1}{13}\) Thus, the probability of drawing a King given that the card is Red is \(\frac{1}{13}\).

Key concepts

Understanding Probability Concepts

Probability is a fascinating field that studies the likelihood of various outcomes happening in different scenarios. It helps us analyze situations involving randomness and uncertainty. When dealing with probability, we often use mathematical formulas to express how likely an event is to occur.
In probability, outcomes are quantified, ranging from 0 to 1. A probability of 0 means an event is impossible, while a probability of 1 indicates certainty. For example, the probability of drawing a card from a deck is expressed numerically and allows us to predict outcomes based on known information.

• Probability is about predicting how often an event will occur in the long run.
• A probability of 0.5 signifies an equal likelihood as flipping a coin and landing on either side.
• Probabilities are often expressed as fractions, decimals, or percentages.

Exploring Card Deck Probability

Card deck probability is all about calculating probabilities with a standard deck of cards. A standard deck contains 52 cards with four suits: Hearts, Diamonds, Clubs, and Spades. Each suit has 13 cards, including numbers from 2 to 10, and four face cards: King, Queen, Jack, and Ace.
Sometimes, when dealing with card deck probability, certain conditions are set, such as drawing a card that is already known to be of a particular characteristic or suit. For instance, when calculating the probability of drawing a King from the red cards (Hearts and Diamonds), like in the provided exercise, the initial condition alters the probability calculation.

• A deck has an equal number of red (26) and black (26) cards, each having two suits.
• Face cards, such as Kings, are equally distributed among the suits.
• Knowing some prior condition, like the card's color, can impact the probability of outcome events.

Recognizing Events in Probability

In probability, an "event" represents a specific outcome or a set of outcomes from a particular experiment or random trial. Events can be simple, involving a single outcome, or compound, involving multiple outcomes. Understanding these concepts is key to solving probability questions.
When analyzing events, it's important to consider how they relate to one another. Some events are independent, meaning the outcome of one does not influence the other. Others are conditional, like in the example of drawing a card that is already red, influencing the probability of it being a King.

• Simple events focus on a single outcome, like drawing a specific card.
• Compound events combine several outcomes under one umbrella scenario.
• Conditional events require focusing on the probability of an event given another has occurred.

Understanding event relationships helps in calculating accurate probabilities, especially when conditions such as the color or suit of a card are already established.