Q3.

Disprove the following statement by giving a counterexample. A counterexample is a specific case that shows a statement is false. Explain.

Every real number has a multiplicative inverse.

Verified

Answer

0 is the real number which does not has a multiplicative inverse.

1Step 1 - Define real number

Combine sets of rational and irrational number is real number.

2Step 2 - Define multiplicative inverse

Let a be the real number such that $a \cdot \frac{1}{a} = 1$ then $\frac{1}{a}$ is the multiplicative inverse of a

3Step 3 - Write counterexample

As, 0 is a real number but there does not exist a number of the form $\frac{1}{0}$

So, 0 does not has a multiplicative inverse.

Thus, every real number does not has a multiplicative inverse.