Prove √3 √7 are irrational no
Answers
Answer:
because ✓3 and √5 are not a square root of any number
Answer:
Rational numbers are those which can be expressed as the ratio of two numbers. When a number can be expressed in the form of numerator and a denominator is called real or rational number . For example 2.5 is a rational number as it can be expressed in the form of a numerator and a denominator.
2.5=5/2 [5/2 is the fractional part of 2.5]
Irrational numbers are those which can not be expressed as a fraction of two numbers. That means when a number can't be expressed in terms of a numerator or a denominator.
Here the given numbers are √3 and √7 . √3=1.73 and √7=2.64. Since 1.73 and 2.64 can not be expressed as the fraction of two numbers, √3 and √7 are irrational numbers.
Step-by-step explanation: