The statement given in the question is false. The product of two irrational numbers is not an irrational number always.

The product of two irrational number is “sometime” irrational. Its is possible that some irrational number may multiply to from a rational product.

The correct option is B False. This statement is FALSE : the product of two irrational numbers can be a rational number. Example :.

3 янв. 2022 г. · The product of any two irrational numbers is a. always an irrational number b. always a rational number c. always an integer

9 янв. 2020 г. · No. The product of two irrational numbers will not be irrational. Example: Consider two irrational numbers ( 4 − 3 ) and ( 4 + 3 ) ( 4 − 3 ) ( 4 + 3 ) = 16 ...

20 сент. 2020 г. · Yes, the product of two irrational numbers is always an irrational number just as the product of two rational numbers is always a rational number.

18 мая 2024 г. · No, but the set of pairs of irrational numbers that multiply to a rational has measure 0 as a subset of R 2. Basically the product is almost always irrational.

25 сент. 2013 г. · But it turns out that books disproves the statement saying $\sqrt2\cdot\sqrt2=2$ which is a rational number and hence Product of two irrational ...

Therefore, for the given question we can say that the product of two irrational numbers are not always irrational. Note: While taking examples to prove whether ...

9 июн. 2024 г. · The product of 2 irrational numbers cannot be proved to be always irrational as it sometimes isn't! For example, √3 times √3 is 3, which is ...