Asked by grampa

An irrational number is a number that cannot be expressed as a simple fraction, meaning it cannot be written as the ratio of two integers. Among the numbers you listed:

- \(-7\), \(8\), \(37\), \(4\), and \(3.6363636363636363...\) (which is a repeating decimal) are all rational numbers.
- \(52.781654292\) is also a rational number because it can be expressed as a fraction.
- \(\sqrt{3}\) is an irrational number because it cannot be expressed as a fraction of two integers.

Therefore, the only irrational number from the list is \(\sqrt{3}\).

It appears that your question is missing the context needed to provide the options a, b, c, or d. If you can provide the specific options associated with your question regarding rational and irrational numbers, I will be happy to identify the irrational one.

It looks like there may have been a misunderstanding. If you have specific options labeled as a, b, c, and d, please list them so I can help you identify which one is irrational.

From your earlier message, we identified \(\sqrt{3}\) as the irrational number. If that corresponds to one of your options, please let me know how your options are structured!

I apologize for the confusion. Based on your original list of numbers, the correct answer for the irrational number is:

**√3**

If you have options labeled as a, b, c, d, where √3 corresponds to one of those letters, then that letter would be your answer. If you provide the specific option labels, I can confirm which is correct.