On Rational and Irrational Numbers Irrational number multiply irrational number; irrational number divide irrational number; irrational number add irrational number; irrational number subtract irrational number; rational number multiply irrational number; rational number divide irrational number; rational number add irrational number; rational number subtract irrational number

On Rational and Irrational Numbers Irrational number multiply irrational number; irrational number divide irrational number; irrational number add irrational number; irrational number subtract irrational number; rational number multiply irrational number; rational number divide irrational number; rational number add irrational number; rational number subtract irrational number

Irrational number multiplied by irrational number: possible irrational number (e.g.√2 3), possible rational number (e.g.√2 2).
An irrational number: A probable irrational number, a probable rational number.
Irrational number plus irrational number: possible irrational number (√2 3), possible rational number (-√2 2).
An irrational number minus an irrational number: a probable irrational number.
A rational number multiplied by an irrational number: generally an irrational number. When a rational number is 0, the result is a rational number of 0.
Rational number division irrational number: generally irrational number, when rational number is 0, the result is rational number 0.
Rational number plus irrational number: irrational number.
Rational number minus irrational number: irrational number.

Why are irrational numbers more than rational numbers The more detailed the better, please!

In short, there are infinite irrational numbers between any two rational numbers. All real numbers can cover the whole number axis, but all rational numbers can not cover the whole number axis. If any two rational numbers are adjacent to each other, there must be infinite irrational numbers between them. First of all, what is "many "?