Give an example of each, of two irrational numbers whose: (i) Differe

1.	Give an example of each, of two irrational numbers whose: (i) Difference is a rational number.(ii) Difference is an irrational number.(iii) Sum is a rational number.(iv) Sum is an irrational number.(v) Product is a rational number.(vi) Product is an irrational number.(vii) Quotient is a rational number.(viii) Quotient is an irrational number.
Answer» (i) \(\sqrt3\) is an irrational number. Now,\((\sqrt3)-(\sqrt3)\) = 0 0 is the rational number. (ii) Let two irrational numbers are \(5\sqrt{2}\) and \(\sqrt2\) Now, \((5\sqrt{2})-(\sqrt2)\) = \(4\sqrt{2}\) \(4\sqrt{2}\) is an irrational number. (iii) Let two irrational numbers be \(\sqrt{11}\) and \(-\sqrt{11}\) Now,\((\sqrt11)+(\sqrt11)\) = 0 0 is a rational number (iv) Let two irrational numbers are \(4\sqrt6\) and \(\sqrt6\) Now,\((4\sqrt6)+(\sqrt6)\) = \(5\sqrt6\) \(5\sqrt6\) is an irrational number. (v) Let two irrational numbers are \(2\sqrt3\) and \(\sqrt3\) Now, \(2\sqrt3\times\sqrt3\) = \(2\times3\) = 6 6 is a rational number. (vi) Let two irrational numbers are \(\sqrt2\) and \(\sqrt5\) Now, \(\sqrt2\times\sqrt5\) = \(\sqrt10\) \(\sqrt10\) is a irrational number. (vii) Let two irrational numbers are \(3\sqrt6\) and \(\sqrt6\) Now, \(\frac{3\sqrt6}{\sqrt6}\) = 3 3 is a rational number. (viii) Let two irrational numbers are \(\sqrt6\) and \(\sqrt2\) Now, \(\frac{\sqrt6}{\sqrt2}\) = \(\frac{\sqrt3\times\sqrt2}{\sqrt{2}}\) \(= \sqrt3\) \(\sqrt3\) is an irrational number.

Give an example of each, of two irrational numbers whose: (i) Difference is a rational number.(ii) Difference is an irrational number.(iii) Sum is a rational number.(iv) Sum is an irrational number.(v) Product is a rational number.(vi) Product is an irrational number.(vii) Quotient is a rational number.(viii) Quotient is an irrational number.

Answer»

(i) \(\sqrt3\) is an irrational number.

Now,\((\sqrt3)-(\sqrt3)\) = 0

0 is the rational number.

(ii) Let two irrational numbers are \(5\sqrt{2}\) and \(\sqrt2\)

Now, \((5\sqrt{2})-(\sqrt2)\) = \(4\sqrt{2}\)

\(4\sqrt{2}\) is an irrational number.

(iii) Let two irrational numbers be \(\sqrt{11}\) and \(-\sqrt{11}\)

Now,\((\sqrt11)+(\sqrt11)\) = 0

0 is a rational number

(iv) Let two irrational numbers are \(4\sqrt6\) and \(\sqrt6\)

Now,\((4\sqrt6)+(\sqrt6)\) = \(5\sqrt6\)

\(5\sqrt6\) is an irrational number.

(v) Let two irrational numbers are \(2\sqrt3\) and \(\sqrt3\)

Now, \(2\sqrt3\times\sqrt3\) = \(2\times3\)

= 6

6 is a rational number.

(vi) Let two irrational numbers are \(\sqrt2\) and \(\sqrt5\)

Now, \(\sqrt2\times\sqrt5\) = \(\sqrt10\)

\(\sqrt10\) is a irrational number.

(vii) Let two irrational numbers are \(3\sqrt6\) and \(\sqrt6\)

Now, \(\frac{3\sqrt6}{\sqrt6}\) = 3

3 is a rational number.

(viii) Let two irrational numbers are \(\sqrt6\) and \(\sqrt2\)

Now, \(\frac{\sqrt6}{\sqrt2}\) = \(\frac{\sqrt3\times\sqrt2}{\sqrt{2}}\)

\(= \sqrt3\)

\(\sqrt3\) is an irrational number.