How do you solve questions of probability involving random sample numbers.

It depends upon what kind of problem you are trying to solve. Do you have a specific question in mind?

To solve probability questions involving random sample numbers, you typically need to understand the concepts of probability and statistics. Here are some general steps to help you solve these types of problems:

1. Understand the question: Read the question carefully and make sure you understand what is being asked. Identify the key information given and what you are trying to find.

2. Define the probability: Determine what event or outcome you are interested in calculating the probability for. This might involve counting possibilities or identifying relevant variables.

3. Identify the sample space: The sample space is the set of all possible outcomes for a given experiment or situation. It represents all the different outcomes that can occur.

4. Determine the sample size: The sample size refers to the number of random observations or numbers you are working with. This can be provided in the question, or you may need to specify it yourself.

5. Calculate the probability: Different types of probability questions require different approaches. Some common techniques include:
- Counting methods: If the question involves counting possibilities, you may need to use techniques such as permutations or combinations.
- Probability rules: You can apply fundamental probability rules such as the multiplication rule, addition rule, or conditional probability to calculate the probability.
- Probability distributions: If the question involves a specific probability distribution (e.g., binomial, normal), you may need to use the corresponding formulas or tables.

6. Check your answer: After calculating the probability, verify if the answer makes sense in the given context. Ensure that your calculation is logical and aligns with the information provided in the question.

Remember, the specific steps and calculations may vary depending on the nature of the problem and the probability concepts involved. It's essential to have a good understanding of the underlying principles of probability and statistics to accurately solve these types of questions.