Question
Question: Describe the following set in Roster form: \(\left\\{ x\in R:x>x \right\\}\)...
Describe the following set in Roster form:
\left\\{ x\in R:x>x \right\\}
Solution
Hint: In this question, we are given a set in the set builder form and we are asked to describe the same in the roster form. Therefore, we should first understand the roster method of representing a set and then find out all the elements of the set which satisfy the given condition. Thereafter we can use these elements to write the given set in the set builder form.
Complete step-by-step answer:
In this method we have to convert the set from set builder form to Roster form. Therefore, we should first understand the definition of the set builder and roster form which are as follows:
(a)In the set builder form, the property which an element in the set satisfies is specified by writing a variable followed by a colon and then the property satisfied by the variable. Thus, the variable can take all the values which satisfy the property and thus all such values of the variables will be elements of the set. For example, in the set
{x: property of x}
all values of x which satisfy the given condition will be part of the set……………… (1.1)
(b)In the roster form, all the elements of the set are written explicitly within curly braces with the elements separated by a comma. For example, if a, b, c, d and e are elements of the set A, then it can be represented as
A={a,b,c,d,e}………………………… (1.2)
In this question, if we name the given set to be S, the it is represented as
S=\left\\{ x\in R:x>x \right\\}..........(1.3)
Now, we know that if any number satisfies x>0, then it must satisfy x−x>0 that implies that 0>0, which is a false statement.
So, we conclude that there is no number x such that x>0 in the whole statement of Real Numbers.
Hence, the set of \left\\{ x\in R:x>x \right\\} is an empty/ void/ null set and contains no elements. This can be represented by the Greek symbol of ϕ. That is \left\\{ x\in R:x>x \right\\}=\phi .
Note: We should note that in this case no number satisfies the condition given in the question, so the set contains 0 number of elements. However, it is not having any problem as a set can contain 0 number of elements and can be termed as an empty/ void/ null set.