answersLogoWhite

0


Best Answer

binomial, trinomial, sixth-degree polynomial, monomial.

User Avatar

Wiki User

14y ago
This answer is:
User Avatar
More answers
User Avatar

Danmar Arela

Lvl 2
3y ago

[object Object]

This answer is:
User Avatar

Add your answer:

Earn +20 pts
Q: What are three types of polynomials?
Write your answer...
Submit
Still have questions?
magnify glass
imp
Related questions

Give examples of some kinds of polynomials?

Binomials and trinomials are two types of polynomials. The first has two terms and the second has three.


Types of functions?

there are various types of functions namely composite,polynomials, power,root


Can the sum of three polynomials again be a polynomial?

The sum of two polynomials is always a polynomial. Therefore, it follows that the sum of more than two polynomials is also a polynomial.


What has the author Richard Askey written?

Richard Askey has written: 'Three notes on orthogonal polynomials' -- subject(s): Orthogonal polynomials 'Recurrence relations, continued fractions, and orthogonal polynomials' -- subject(s): Continued fractions, Distribution (Probability theory), Orthogonal polynomials 'Orthogonal polynomials and special functions' -- subject(s): Orthogonal polynomials, Special Functions


Would the sum of three polynomials again be a polynomial?

Yes.


What is the difference between polynomials and trinomials?

A trinomial is a polynomial with three terms.


Polynomials have factors that are?

Other polynomials of the same, or lower, order.


Name three mathematicians who contributed to polynomials?

alexander enid blyton kk sharma


What are trinomials in algebra?

Trinomials are polynomials with three terms. ie. x2+2x+1


How polynomials and non polynomials are alike?

they have variable


What are polynomials that have factors called?

Reducible polynomials.


What has the author P K Suetin written?

P. K. Suetin has written: 'Polynomials orthogonal over a region and Bieberbach polynomials' -- subject(s): Orthogonal polynomials 'Series of Faber polynomials' -- subject(s): Polynomials, Series