Consider the polynomial, 5x^5 - 9x^3 + 2x^11 + 6.
The degree is:
(2
4
6
11)
The leading coefficient is
(2
4
6
11)
The number of terms is:
(2
4
6
11)
The constant term is:
(2
4
6
11)
The degree is 11.
The leading coefficient is 2.
The number of terms is 4.
The constant term is 6.
how do you get this answer
To find the degree of a polynomial, we look for the highest exponent of x that appears in the polynomial. In this case, the highest exponent is 11, so the degree is 11.
The leading coefficient is the coefficient of the term with the highest exponent. In this case, that term is 2x^11, so the leading coefficient is 2.
The number of terms is simply the count of how many terms are present in the polynomial. In this case, there are four terms: 5x^5, -9x^3, 2x^11, and 6.
The constant term is the term that does not contain any variable (x). In this case, the constant term is 6.