Let R be a relation from A to B. Both sets are finite, with |A|=n and |B|=m. Define the complementary relation "R bar" as follows: R bar={(a, b)|(a,b)∈R} Calculate |R bar|.

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By definition

$\bar{R}=\left\{\left.(a,b)\right|(a,b)\in R\right\}$

This means that the set $\bar{R}$ consists of ALL POSSIBLE pairs $\left\{\left.(x,y)\right| x\in A\,\,\,\text{and}\,\,\,y\in B\right\}$ .

Since the set $A$ consists of $|A|=n$ elements, and the set $B$ consists of $|B|=m$ elements, then the number of possible pairs is

$\left|\bar{R}\right|=n\cdot m$

since the elements for the pair $(x,y)$ are selected independently of each other.

ANSWER

$\left|\bar{R}\right|=mn$