Answer:
Part 1) [tex]5x^{3} -8x[/tex] ----> Is a cubic Polynomial/ Is a binomial
Part 2) [tex]-6-x^{5} -3x^2[/tex] --->Is a quintic (5th Degree) Polynomial/ Is a trinomial
Part 3) [tex](1/3)x^4[/tex] ----> Is a quartic (4th Degree) Polynomial/ Is a monomial
Part 4) [tex](6/7)x+1[/tex] ----> Is a linear Polynomial/ Is a binomial
Part 5) [tex]-0.7x^2[/tex] -----> Is a quadratic Polynomial/ Is a monomial
Step-by-step explanation:
we know that
Polynomials can be classified in two different ways - by the number of terms and by their degree
The degree of a polynomial is calculated by finding the largest exponent in the polynomial
The polynomial is classified by the number of terms as:
1) The polynomial with only one term is called monomial
2) The polynomial with two-term is called binomial
3) The polynomial with three-term are called trinomial
4) The polynomial containing only the constant term is a constant polynomial
5) If the expression contains more than three terms, then the expression is called a Polynomial
Part 1) we have
[tex]5x^{3} -8x[/tex]
Name using Degree
The largest exponent in the polynomial is 3
so
Is a cubic Polynomial
Name using number of terms
The polynomial has only two terms
so
Is a binomial
Part 2) we have
[tex]-6-x^{5} -3x^2[/tex]
Name using Degree
The largest exponent in the polynomial is 5
so
Is a quintic (5th Degree) Polynomial
Name using number of terms
The polynomial has only three terms
so
Is a trinomial
Part 3) we have
[tex](1/3)x^4[/tex]
Name using Degree
The largest exponent in the polynomial is 4
so
Is a quartic (4th Degree) Polynomial
Name using number of terms
The polynomial has only one term
so
Is a monomial
Part 4) we have
[tex](6/7)x+1[/tex]
Name using Degree
The largest exponent in the polynomial is 1
so
Is a linear Polynomial
Name using number of terms
The polynomial has only two terms
so
Is a binomial
Part 5) we have
[tex]-0.7x^2[/tex]
Name using Degree
The largest exponent in the polynomial is 2
so
Is a quadratic Polynomial
Name using number of terms
The polynomial has only one term
so
Is a monomial
