Question

Define the irrational number . Also explain how irrational numbers differ from rational numbers .

Answer 1

 an irrational number is a real number that cannot be expressed as a ratio ofintegers, i.e. as a fraction. Therefore, irrational numbers, when written as decimal numbers, do not terminate, nor do they repeat. For example, the number π starts with 3.14159265358979, but no finite number of digits can represent it exactly and it does not end in a segment that repeats itself infinitely often. The same can be said for any irrational number.

Answer 2

Step-by-step explanation:

Rational number

The positive negative nd fractional numbers are called Rational numbers

Irrational Numbers

the numbers which are not the ratios of integers are called irrational numbers