Answer:
The correct option is A.
Step-by-step explanation:
The given expression is,
[tex]9a^4b^3+24a^3b^2-15a^2b[/tex]
The greatest common factors of two numbers is the greatest number that divides both numbers completely.
We can write each term as,
[tex]9a^4b^3=3\times 3\times a\times a\times a\times a\times b\times b\times b[/tex]
[tex]24a^3b^2=2\times 2\times 2\times 3\times a\times a\times a\times b\times b[/tex]
[tex]15a^2b=3\times 5\times a\times a\times b[/tex]
We can say that the factors 3, a, a and b are common in all the terms, therefore the greatest common factor is 3a²b.
Take 3a²b as GCF,
[tex]9a^4b^3+24a^3b^2-15a^2b=3a^2b(3a^2b^2+8ab-5)[/tex]
Therefore the correct option is A.
