To factor the polynomial expression 15x³ + 5x² + 6x + 2 by grouping, we will follow a systematic approach. Here’s how we do it:
- First, let’s group the terms:
(15x³ + 5x²) + (6x + 2)
- Next, we factor out the common factors from each group:
From the first group (15x³ + 5x²), we can factor out 5x²:
5x²(3x + 1)
From the second group (6x + 2), we can factor out 2:
2(3x + 1)
- Now we can rewrite the expression using these factored forms:
5x²(3x + 1) + 2(3x + 1)
Notice that (3x + 1) is a common factor in both terms. We can factor out (3x + 1):
(3x + 1)(5x² + 2)
- In conclusion, the factored form of the expression 15x³ + 5x² + 6x + 2 by grouping is:
(3x + 1)(5x² + 2)
This means the resulting expression after factoring by grouping is (3x + 1)(5x² + 2).