Describe all the sets and subsets the number 64−−√ belongs to and enter the number corresponding to the correct answer as your response.
Enter Number 1: Rational Numbers, Integers, Whole Numbers, Natural Numbers
Enter Number 2: Rational Numbers, Integers, Whole Numbers
Enter Number 3: Rational Numbers, Integers
Enter Number 4: Rational Numbers
Enter Number 5: Irrational Numbers(1 point)
Sure! An irrational number is a real number that cannot be expressed as a simple fraction or ratio of two integers. In other words, it is a number that cannot be written as a terminating or repeating decimal.
One common example of an irrational number is the square root of a non-perfect square, such as √2 or √5. Other examples include π (pi) and e (the base of the natural logarithm). These numbers have decimal representations that go on forever without repeating or ending.
Irrational numbers are infinite and non-repeating, making them quite different from rational numbers, which can always be expressed as fractions.
You're welcome! I'm glad I could help clarify the concept for you. If you have any more questions, feel free to ask!
Describe all the sets and subsets the number 23 belongs to and enter the number corresponding to the correct answer as your response.
Enter Number 1: Rational Numbers, Integers, Whole Numbers, Natural Numbers
Enter Number 2: Rational Numbers, Integers, Whole Numbers
Enter Number 3: Rational Numbers, Integers
Enter Number 4: Rational Numbers
Enter Number 5: Irrational Numbers
Enter Number 5: Irrational Numbers.
can you explain a irrational number?
thank you! my lesson didnt explain it clearly :)
Describe all the sets and subsets the number 2/3 belongs to and enter the number corresponding to the correct answer as your response.
Enter Number 1: Rational Numbers, Integers, Whole Numbers, Natural Numbers
Enter Number 2: Rational Numbers, Integers, Whole Numbers
Enter Number 3: Rational Numbers, Integers
Enter Number 4: Rational Numbers
Enter Number 5: Irrational Numbers