Practice Problems on Rational and Irrational Numbers
1. Simplify 3/7 × 28/15 ÷ 14/5
2. Simplify 3/7 + (-2)/21 × (-5)/6
3. Find (2/3) × (-5/7) + (7/3) + (2/3) × ((-2)/7)
4. Prove √144 is not irrational number.
Rational and Irrational Numbers
Rational numbers and Irrational numbers are real numbers with unlike characteristics. Rational numbers are the numbers which can be represented in the A/B form where B ≠ 0. Irrational numbers are the numbers that cannot be represented in A / B form. In this article, we’ll learn the concepts of rational numbers and irrational numbers and explore the difference between them.
Table of Content
- What is Rational number?
- How to identify rational numbers?
- What are Irrational Numbers?
- How to Identify Irrational Numbers?
- How to Classify Rational and Irrational Numbers?
- Difference Between Rational and Irrational Numbers