Let's match each example to the correct polynomial type:
-
A binomial of degree 2:
Answer: \(x^2 + 1\) -
A monomial of degree 3:
Answer: \(2x^3\) -
A trinomial of degree 4:
Answer: \(x^4 + x + 10\) -
A monomial of degree 0:
Answer: \(3\) (Note: A monomial of degree 0 is a constant) -
A binomial of degree 1:
Answer: \(x + 1\) (Not listed, but presumably matches the context)
So, if you rearrange your results, you have:
- A binomial of degree 2: \(x^2 + 1\)
- A monomial of degree 3: \(2x^3\)
- A trinomial of degree 4: \(x^4 + x + 10\)
- A monomial of degree 0: \(3\)
- A binomial of degree 1: (Assumed to be an example such as \(x + 1\), not explicitly listed)