To find the product of the two functions, f(x) and g(x), we begin with their definitions:
- f(x) = 27x^5 + 33x^4 + 21x^3
- g(x) = 3x^2
The product of the functions, denoted as (f * g)(x), can be computed by multiplying each term in f(x) by the entire function g(x).
Let’s perform the multiplication step-by-step:
- Multiply the leading term of f(x):
- Multiply the second term of f(x):
- Multiply the third term of f(x):
27x^5 * 3x^2 = 81x^{7}
33x^4 * 3x^2 = 99x^{6}
21x^3 * 3x^2 = 63x^{5}
Now that we have the products of each term, we can combine them:
(f * g)(x) = 81x^{7} + 99x^{6} + 63x^{5}
Therefore, the product of the functions is:
(f * g)(x) = 81x^{7} + 99x^{6} + 63x^{5}
And that’s how you compute the product of f(x) and g(x)!