Question: Let we have the sets as \[A = \left\\{ {1,2,3} \right\\},B = \left\\{ {1,3,5} \right\\}\]. If relati...

Question

Let we have the sets as $A = \left\\{ {1,2,3} \right\\},B = \left\\{ {1,3,5} \right\\}$ . If relation R from A to B is given by $R = \left\\{ {\left( {1,3} \right),\left( {2,5} \right),\left( {3,3} \right)} \right\\}$ . Then ${R^{ - 1}}$ is
1. $\left\\{ {\left( {3,3} \right),\left( {3,1} \right),\left( {5,2} \right)} \right\\}$
2. $\left\\{ {\left( {1,3} \right),\left( {2,5} \right),\left( {3,3} \right)} \right\\}$
3. $\left\\{ {\left( {1,3} \right),\left( {5,2} \right)} \right\\}$
4. None of these

Answer 1

Solution

We are given a relation and we are supposed to find its inverse. An inverse relation can be obtained by interchanging the values in each ordered pair in the relation. In the inverse of a relation, the x and y values are interchanged. If the values of both x and y are the same in an ordered pair, then the same appears in the inverse of the relation.

Complete step-by-step solution:
Suppose, x and y are two sets of ordered pairs. And set x has relation with set y, then the values of set x are called domain whereas the values of set y are called range.
An inverse relation is a set of ordered pairs obtained by interchanging the first and the second elements of each pair in the original function. If a function contains a point $\left( {a,b} \right)$ then the inverse relation of this function contains the point $\left( {b,a} \right)$ .
Generally, the method of calculating an inverse is swapping of coordinates x and y. This newly created inverse is a relation but not necessarily a function.
The original function has to be a one-to-one function to assure that its inverse will also be a function. A function is said to be a one to one function only if every second element corresponds to the first value (values of x and y are used only once).
We are given $A = \left\\{ {1,2,3} \right\\}$
$B = \left\\{ {1,3,5} \right\\}$
$R = \left\\{ {\left( {1,3} \right),\left( {2,5} \right),\left( {3,3} \right)} \right\\}$
Therefore we get ${R^{ - 1}} = \left\\{ {\left( {3,3} \right),\left( {3,1} \right),\left( {5,2} \right)} \right\\}$
Therefore option (1) is the correct answer.

Note: A relation is the relationship between two or more sets of values. If your function is defined as a list of ordered pairs, simply swap the x and y values to find the inverse of relation. Remember, the inverse relation will be a function only if the original function is one-to-one and onto. If the graph of a function contains a point (a, b), then the graph of the inverse relation of this function contains the point (b, a).