Points to Remember:
- Basic probability principles: Probability = (Favorable Outcomes) / (Total Possible Outcomes)
- Dice properties: A standard six-sided die has faces numbered 1 to 6. Each face has an equal probability of appearing.
Introduction:
Probability is a branch of mathematics that deals with the likelihood of an event occurring. In this case, we are dealing with a simple probability problem involving the throw of a single, six-sided die. The die is assumed to be fair, meaning each face (numbered 1 to 6) has an equal chance of appearing when the die is thrown. We will calculate the probability of obtaining specific outcomes.
Body:
The question lacks specification on what outcome we are interested in. To fully address the question, we will calculate the probability of several possible outcomes:
1. Probability of getting a specific number (e.g., 3):
- Favorable Outcomes: There is only one face with the number 3.
- Total Possible Outcomes: There are six possible outcomes (1, 2, 3, 4, 5, 6).
- Probability: Probability (getting a 3) = 1/6
2. Probability of getting an even number:
- Favorable Outcomes: There are three even numbers (2, 4, 6).
- Total Possible Outcomes: There are six possible outcomes.
- Probability: Probability (getting an even number) = 3/6 = 1/2
3. Probability of getting an odd number:
- Favorable Outcomes: There are three odd numbers (1, 3, 5).
- Total Possible Outcomes: There are six possible outcomes.
- Probability: Probability (getting an odd number) = 3/6 = 1/2
4. Probability of getting a number less than 4:
- Favorable Outcomes: There are three numbers less than 4 (1, 2, 3).
- Total Possible Outcomes: There are six possible outcomes.
- Probability: Probability (getting a number less than 4) = 3/6 = 1/2
5. Probability of getting a number greater than or equal to 4:
- Favorable Outcomes: There are three numbers greater than or equal to 4 (4, 5, 6).
- Total Possible Outcomes: There are six possible outcomes.
- Probability: Probability (getting a number greater than or equal to 4) = 3/6 = 1/2
Conclusion:
The probability of obtaining a specific outcome when throwing a fair six-sided die depends on the nature of the desired outcome. We have demonstrated how to calculate the probability for various scenarios, consistently applying the fundamental principle of probability: (Favorable Outcomes) / (Total Possible Outcomes). The probabilities calculated range from 1/6 for a specific number to 1/2 for broader categories like even or odd numbers. This simple example illustrates the core concepts of probability theory, which have wide-ranging applications in various fields, from statistics and risk assessment to game theory and decision-making. Further exploration into probability distributions and statistical analysis can provide a more comprehensive understanding of uncertainty and its quantification.
MPPCS Notes brings Prelims and Mains programs for MPPCS Prelims and MPPCS Mains Exam preparation. Various Programs initiated by MPPCS Notes are as follows:-- MPPCS Mains 2025 Tests and Notes Program
- MPPCS Prelims Exam 2025- Test Series and Notes Program
- MPPCS Prelims and Mains 2025 Tests Series and Notes Program
- MPPCS Detailed Complete Prelims Notes 2025