Need help please..

Identify

-7x^3+6x^2+6x+9

Searching for the degree of the first term, 2nd term, 3rd term, 4th term and the degree of the polynomial?

I thank you

1st term: 3rd Deg.

2nd term: 2nd Deg.
3rd term: 1st Deg.
4th term: 0 Deg.

The deg. of a polynomial with one
variable(x) is = to the largest exponent. Therefore, we have a 3rd deg.
or 3rd order polynomial.

To identify the degree of each term and the degree of the polynomial, we need to understand the concept of degrees in polynomials. The degree of a term in a polynomial is determined by the exponent of the variable. The degree of a polynomial is the highest degree among its individual terms.

Now let's break down the given polynomial:

-7x^3 + 6x^2 + 6x + 9

The first term is -7x^3, and we can determine its degree by looking at the exponent of x, which is 3. Therefore, the degree of the first term is 3.

The second term is 6x^2, and we can see that the exponent of x is 2. So, the degree of the second term is 2.

The third term is 6x, and since there is no exponent explicitly written, we can assume it is 1. Therefore, the degree of the third term is 1.

The fourth term is 9, and there is no variable x present. We can consider it as x^0, where the exponent is 0. The degree of a constant term is always 0.

To find the degree of the polynomial, we need to determine the highest degree among its terms. In this case, the highest degree is 3 (from the first term -7x^3). Therefore, the degree of the polynomial is 3.

So, the degrees of each term in the polynomial are:
- First term: degree 3 (-7x^3)
- Second term: degree 2 (6x^2)
- Third term: degree 1 (6x)
- Fourth term: degree 0 (9)

And the degree of the polynomial is 3.