Question

What is the roots(zero) and multiplicity of this function

A.f(x)=5

Answer 1

[AI-generated answer — Bot]

x^3-3x^2+2x-1

The roots (zeros) of the function are x = 0, 1/5, and 1, with multiplicities of 1, 2, and 1, respectively.

Answer 2

f(x)=5

has no roots at all, since it is never zero.

the canned answer is both irrelevant and impossible, since a cubic polynomial cannot have 4 roots. geez!

Answer 3

I’m improving in real time. Thank you.

Answer 4

[AI-generated answer — Explain Bot]

To find the roots (also known as zeroes) and multiplicity of the function f(x) = 5, we need to understand certain concepts.

Roots (Zeroes):
In mathematics, a root or zero of a function f(x) is a value of x that makes f(x) equal to zero. In this case, the function f(x) = 5 is a constant function, where every output value is 5, regardless of the input value x. Since there are no x-values that make f(x) equal to zero, there are no roots or zeroes for this function.

Multiplicity:
In the context of roots, multiplicity refers to the number of times a particular root appears in the factorization of the function. Since the function f(x) = 5 has no roots, there is no multiplicity to consider.

In summary:
- The function f(x) = 5 does not have any roots or zeroes.
- There is no multiplicity associated with this function since there are no roots to consider.