Deepak Randomly Chooses Two Marbles From The Bag, One At A Time, And Replaces The Marble After Each Choice. What Is The Probability He Will Choose One Green Marble And Then One Red Marble? Express The Probabilities In Fraction

Probability of Choosing One Green Marble and Then One Red Marble

In probability theory, the concept of choosing marbles from a bag is a common example used to illustrate the principles of probability. In this scenario, Deepak randomly chooses two marbles from the bag, one at a time, and replaces the marble after each choice. We are interested in finding the probability that he will choose one green marble and then one red marble.

To solve this problem, we need to understand the concept of probability and how it applies to this scenario. Probability is a measure of the likelihood of an event occurring. In this case, the event is choosing one green marble and then one red marble.

Assumptions

We assume that the bag contains an equal number of green and red marbles. We also assume that the marbles are randomly mixed and that the probability of choosing a green marble is equal to the probability of choosing a red marble.

To calculate the probability of choosing one green marble and then one red marble, we need to consider the probability of each event occurring.

Step 1: Choosing a Green Marble

The probability of choosing a green marble from the bag is 1/2, since there are an equal number of green and red marbles.

Step 2: Choosing a Red Marble

After choosing a green marble, the probability of choosing a red marble is still 1/2, since the marbles are replaced after each choice.

Combining the Probabilities

To find the probability of choosing one green marble and then one red marble, we need to multiply the probabilities of each event occurring.

P(Green and then Red) = P(Green) x P(Red) = (1/2) x (1/2) = 1/4

In conclusion, the probability of Deepak choosing one green marble and then one red marble is 1/4 or 25%.

This problem can be used to illustrate the concept of probability in real-world scenarios. For example, imagine a game show where a contestant is randomly selecting a prize from a bag. The bag contains an equal number of green and red prizes. The contestant wants to know the probability of selecting a green prize and then a red prize. Using the formula above, we can calculate the probability as 1/4 or 25%.

The concept of probability is used in many real-world applications, including:

• Insurance: Insurance companies use probability to calculate the likelihood of an event occurring, such as a car accident or a natural disaster.
• Finance: Financial institutions use probability to calculate the likelihood of a stock or bond performing well.
• Medicine: Medical professionals use probability to calculate the likelihood of a patient responding to a treatment.

In conclusion, the probability of Deepak choosing one green marble and then one red marble is 1/4 or 25%. This problem illustrates the concept of probability and how it can be used to calculate the likelihood of an event occurring. The concept of probability is used in many real-world applications, including insurance, finance, and medicine.

• Khan Academy: Probability
• Math Is Fun: Probability
• Wikipedia: Probability

• Probability Theory: A comprehensive guide to probability theory
• Statistics: A guide to statistical analysis
• Data Science: A guide to data science and machine learning
  Probability of Choosing One Green Marble and Then One Red Marble: Q&A

In our previous article, we discussed the probability of Deepak choosing one green marble and then one red marble from a bag. We calculated the probability as 1/4 or 25%. In this article, we will answer some frequently asked questions related to this topic.

Q: What is the probability of choosing a green marble first and then a red marble?

A: The probability of choosing a green marble first and then a red marble is the same as the probability of choosing a red marble first and then a green marble. This is because the marbles are replaced after each choice, so the probability of choosing a green marble or a red marble remains the same.

Q: What is the probability of choosing two green marbles in a row?

A: The probability of choosing two green marbles in a row is (1/2) x (1/2) = 1/4. This is because the probability of choosing a green marble is 1/2, and the probability of choosing another green marble is also 1/2.

Q: What is the probability of choosing two red marbles in a row?

A: The probability of choosing two red marbles in a row is (1/2) x (1/2) = 1/4. This is because the probability of choosing a red marble is 1/2, and the probability of choosing another red marble is also 1/2.

Q: What is the probability of choosing a green marble and then a red marble, and then a green marble?

A: The probability of choosing a green marble and then a red marble, and then a green marble is (1/2) x (1/2) x (1/2) = 1/8. This is because the probability of choosing a green marble is 1/2, the probability of choosing a red marble is 1/2, and the probability of choosing another green marble is 1/2.

Q: What is the probability of choosing a red marble and then a green marble, and then a red marble?

A: The probability of choosing a red marble and then a green marble, and then a red marble is (1/2) x (1/2) x (1/2) = 1/8. This is because the probability of choosing a red marble is 1/2, the probability of choosing a green marble is 1/2, and the probability of choosing another red marble is 1/2.

Q: Can I use this formula to calculate the probability of choosing any two marbles in a row?

A: Yes, you can use this formula to calculate the probability of choosing any two marbles in a row. The formula is P(Marble 1) x P(Marble 2), where P(Marble 1) is the probability of choosing the first marble and P(Marble 2) is the probability of choosing the second marble.

Q: What is the probability of choosing a green marble and then a red marble, and then a green marble, and then a red marble?

A: The probability of choosing a green marble and then a red marble, and then a green marble, and then a red marble is (1/2) x (1/2) x (1/2) x (1/2) = 1/16. This is because the probability of choosing a green marble is 1/2, the probability of choosing a red marble is 1/2, the probability of choosing another green marble is 1/2, and the probability of choosing another red marble is 1/2.

In conclusion, we have answered some frequently asked questions related to the probability of choosing one green marble and then one red marble from a bag. We have also provided examples of how to use the formula to calculate the probability of choosing any two marbles in a row.

• Khan Academy: Probability
• Math Is Fun: Probability
• Wikipedia: Probability

• Probability Theory: A comprehensive guide to probability theory
• Statistics: A guide to statistical analysis
• Data Science: A guide to data science and machine learning