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42 votes
In F(x)=2x-4/x(x^2-4) which are non removable ?

User Tim Wintle
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1 Answer

14 votes
14 votes

Ok, so

Here we have the following function:


F(x)=(2x-4)/(x(x^2-4))

We want to check if the discontinuity of F(x) is removable or non removable.

We could factor the expression in the denominator using the following property:


a^2-b^2=(a+b)(a-b)

And we could apply the common factor property in the numerator.

Then,


\begin{gathered} (2x-4)/(x(x^2-4)) \\ \\ (2(x-2))/(x(x+2)(x-2)) \end{gathered}

We can cancel the "x-2" term.

In the above expression due to (x-2) in the denominator, f(x) becomes undefined at x=2, Hence there is a discontinuity at x=2. However this (x-2) gets cancelled by (x-2) in the numerator, and we obtain:


(2)/(x(x+2))

Notice that the new expression has a discontinuity at the points x=0 and x=-2. For this reason, there is a non removable discontinuity at x=0 and x=-2, because the function becomes undefined at these points and there's not a way to cancel them.

User Orkun Tuzel
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