Question

Factorise fully 15x³ + 3x²y​

Answer 1

To factorise 15x³ + 3x²y fully, we identify the greatest common factor, which is 3x², and rewrite the expression as 3x²(5x + y).

Step-by-step explanation:

The question asks to factorise fully the expression 15x³ + 3x²y. The first step is to identify the greatest common factor (GCF) of the two terms. We can see that both terms have a factor of 3x². When we factor out 3x² from both terms, we are left with 5x and y as the other factors. Thus, the expression can be rewritten as:

3x²(5x + y)

This is the fully factorised form of the given expression, where 3x² is the GCF and (5x + y) is the remaining binomial factor.

Answer 2

Answer: 3x²(5x+y)

Step-by-step explanation:

15x³ + 3x²y​

Apply exponent rule: 15x²x+3x²y

Rewrite 15 as 5*3: 5*3x²x+3x²y

Factor out common terms 3x²: 3x²(5x+y)

Hope this helps!!! :)