Finding the factors of the polynomial x³ + 5x² + 6x – 30 can be achieved through a method known as grouping. This technique involves rearranging and grouping terms in such a way that we can factor out common elements.
Step 1: Group the Terms
First, we will split the polynomial into two groups. We can group the first three terms together and separate the constant:
(x³ + 5x² + 6x) - 30Step 2: Factor the First Group
Next, we will factor out the common factor from the first group:
x²(x + 5)Now, the expression looks like this:
x²(x + 5) - 30Step 3: Rearrange and Factor the Second Group
To make it easier to factor out the remaining part, we can adjust our approach to include the constant with a term from our first group. Let’s rewrite the polynomial in such a way that it makes the terms clearer:
x³ + 5x² + 6x - 30 = (x³ + 5x²) + (6x - 30)This gives us two new groups:
=(x²(x + 5) + 6(x - 5))Step 4: Factor Out Common Binomial
Now we can see that both groups share a common binomial factor:
(x + 5)(x² + 6)Final Factors
So, we conclude that the polynomial x³ + 5x² + 6x – 30 can be factored as:
(x + 5)(x² + 6)We can then verify by expanding:
(x + 5)(x² + 6) = x³ + 6x + 5x² + 30 = x³ + 5x² + 6x - 30Thus, the polynomial is factored correctly!