-(1%2F3))%2F(x-3).jpeg "((1/x)-(1/3))/(x-3)")
Simplifying the Expression: ((1/x)-(1/3))/(x-3)
This article will guide you through the steps of simplifying the expression: ((1/x)-(1/3))/(x-3).
Step 1: Finding a Common Denominator for the Numerator
First, we need to find a common denominator for the fractions in the numerator: (1/x) - (1/3). The least common denominator for x and 3 is 3x.
- Rewrite (1/x) as (3/3x)
- Rewrite (1/3) as (x/3x)
Now, the expression becomes: ((3/3x) - (x/3x))/(x-3)
Step 2: Combining the Fractions in the Numerator
Since the fractions in the numerator now have the same denominator, we can combine them:
- ((3-x)/3x) / (x-3)
Step 3: Simplifying the Division
Dividing by a fraction is the same as multiplying by its reciprocal. Therefore, we can rewrite the expression as:
- ((3-x)/3x) * (1/(x-3))
Step 4: Factoring and Simplifying
Now, we can factor out a -1 from the numerator of the first fraction:
- ((-1)(x-3)/3x) * (1/(x-3))
The (x-3) terms cancel out, leaving us with:
- (-1/3x)
Conclusion
Therefore, the simplified form of the expression ((1/x)-(1/3))/(x-3) is (-1/3x). Remember that this expression is undefined when x = 0 or x = 3.