How do you prove that the function g(x) = x^3 / x is continuous everywhere but x=0?

abrigairaic

abrigairaic

Answered question

2022-08-08

How do you prove that the function g ( x ) = x 3 x is continuous everywhere but x=0?

Answer & Explanation

Royce Golden

Royce Golden

Beginner2022-08-09Added 12 answers

There are several ways to prove continuity, they differ in key ideas and mathematical formality.
The function f is continuous at some point c of its domain if the limit of f(x) as x approaches c through the domain of f exists and is equal to f(c). In mathematical notation, this is written as
lim x c f ( x ) = f ( c )
In detail this means three conditions: 1) first, f has to be defined at c. 2) Second, the limit on the left hand side of that equation has to exist. 3) Third, the value of this limit must equal f(c).
For our function: f ( x ) = x 3 x , any value we replace we have a value, but zero, which will give 0 0 , it is undefined. Therefore, it is not continuous.
Nonetheless, as you can see from the graph below, this function is continuous on 0 , since f ( x ) = x 2 . It is just the parabola masked-out.
But the ideas herein can be used to prove that a true not continuous function is not continuous in a point, e.g. 1 x , apply the ideas herein for 0, it goes to infinity.
graph{x^3/x [-2.5, 2.5, -1.25, 1.25]}

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