(1-x^2)/(1-x)

less than a minute read Jun 16, 2024
(1-x^2)/(1-x)

Simplifying the Expression (1-x^2)/(1-x)

The expression (1-x^2)/(1-x) can be simplified using algebraic manipulation. Here's how:

Factoring the Numerator

The numerator, (1-x^2), is a difference of squares, which can be factored as:

(1-x^2) = (1+x)(1-x)

Simplifying the Expression

Now we can rewrite the original expression:

(1-x^2)/(1-x) = [(1+x)(1-x)]/(1-x)

Since (1-x) appears in both the numerator and denominator, we can cancel it out:

(1-x^2)/(1-x) = (1+x)

However, it's important to note that this simplification is valid only when x ≠ 1. If x = 1, the original expression becomes undefined as it results in division by zero.

Final Result

Therefore, the simplified form of (1-x^2)/(1-x) is (1+x), with the restriction that x ≠ 1.

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