Question

prove that 3√3 is an irrational number​

Answer 1

Answer:

Let 3√3 be a rational number say r . (1/3) r is a rational number because product of two rational number is a rational number is a rational number. ⇒ √3 is a rational number but √3 is not a rational number . Therefore our assumption 3√3 is a rational number is wrong. so 3√3 is an irrational number

Answer 2

Answer:

therefore our consumption for 3√3 is a rational is wrong so always remember thar rational and irrational is always irrational.