The process of factoring out the Greatest Common Factor (GCF) entails pinpointing the most significant number or term that divides uniformly into each term of an expression. This factor is subsequently isolated, which simplifies the expression. This method is crucial in distilling algebraic expressions and equations, assisting in their resolution.
| Topic | Problem | Solution |
|---|---|---|
| None | Factor the given polynomial by finding the greate… | The given polynomial is a sum of two terms: a constant term and a cubic term. The greatest common m… |
| None | Fill in the gap to factorise this expression. \[ … | Divide both terms on the left side of the equation by 3: \(\frac{3x}{3} = x\) and \(\frac{3}{3} = 1… |
| None | Factor out the greatest common factor. If the gre… | \(\text{Find the GCF of } 9s^2 \text{ and } -6s\) |