polynomial

As a verb quiche

is .

As an adjective polynomial is

(algebra) able to be described or limited by a.

As a noun polynomial is

(algebra) an expression consisting of a sum of a finite number of terms, each term being the product of a constant coefficient and one or more variables raised to a non-negative integer power, such as $a\_n\; x^n\; +\; a\_\{n-1\}x^\{n-1\}\; +\; +\; a\_0\; x^0$.

As nouns the difference between nomial and polynomial

is that nomial is a name or term while polynomial is an expression consisting of a sum of a finite number of terms, each term being the product of a constant coefficient and one or more variables raised to a non-negative integer power, such as $a\_n\; x^n\; +\; a\_\{n-1\}x^\{n-1\}\; +\; ...\; +\; a\_0\; x^0$.

As an adjective polynomial is

able to be described or limited by a polynomial.

As adjectives the difference between polyonomous and polynomial

is that polyonomous is having many names or titles while polynomial is able to be described or limited by a polynomial.

As a noun polynomial is

an expression consisting of a sum of a finite number of terms, each term being the product of a constant coefficient and one or more variables raised to a non-negative integer power, such as $a\_n\; x^n\; +\; a\_\{n-1\}x^\{n-1\}\; +\; ...\; +\; a\_0\; x^0$.

As nouns the difference between polynomial and subresultant

is that polynomial is (algebra) an expression consisting of a sum of a finite number of terms, each term being the product of a constant coefficient and one or more variables raised to a non-negative integer power, such as $a\_n\; x^n\; +\; a\_\{n-1\}x^\{n-1\}\; +\; +\; a\_0\; x^0$ while subresultant is (mathematics) a generalization of a resultant that is the product of the pairwise differences of the roots of polynomials.

As an adjective polynomial

is (algebra) able to be described or limited by a.

As nouns the difference between polynomial and pfaffian

is that polynomial is an expression consisting of a sum of a finite number of terms, each term being the product of a constant coefficient and one or more variables raised to a non-negative integer power, such as $a\_n\; x^n\; +\; a\_\{n-1\}x^\{n-1\}\; +\; ...\; +\; a\_0\; x^0$ while Pfaffian is the determinant of a skew-symmetric matrix, capable of being written as the square of a polynomial in the matrix entries.

As an adjective polynomial

is able to be described or limited by a polynomial.

In algebra|lang=en terms the difference between polynomial and ultraradical

is that polynomial is (algebra) an expression consisting of a sum of a finite number of terms, each term being the product of a constant coefficient and one or more variables raised to a non-negative integer power, such as $a\_n\; x^n\; +\; a\_\{n-1\}x^\{n-1\}\; +\; +\; a\_0\; x^0$ while ultraradical is (algebra) a root of the polynomial x⁵ + x + a'', where ''a is a complex number.

As nouns the difference between polynomial and ultraradical

is that polynomial is (algebra) an expression consisting of a sum of a finite number of terms, each term being the product of a constant coefficient and one or more variables raised to a non-negative integer power, such as $a\_n\; x^n\; +\; a\_\{n-1\}x^\{n-1\}\; +\; +\; a\_0\; x^0$ while ultraradical is (algebra) a root of the polynomial x⁵ + x + a'', where ''a is a complex number.

As an adjective polynomial

is (algebra) able to be described or limited by a.

As adjectives the difference between polynomial and multinomial

is that polynomial is able to be described or limited by a polynomial while multinomial is polynomial.

As nouns the difference between polynomial and multinomial

is that polynomial is an expression consisting of a sum of a finite number of terms, each term being the product of a constant coefficient and one or more variables raised to a non-negative integer power, such as $a\_n\; x^n\; +\; a\_\{n-1\}x^\{n-1\}\; +\; ...\; +\; a\_0\; x^0$ while multinomial is polynomial.

As nouns the difference between polynomial and bidegree

is that polynomial is (algebra) an expression consisting of a sum of a finite number of terms, each term being the product of a constant coefficient and one or more variables raised to a non-negative integer power, such as $a\_n\; x^n\; +\; a\_\{n-1\}x^\{n-1\}\; +\; +\; a\_0\; x^0$ while bidegree is (mathematics) an extension of the degree (or order) of a polynomial in certain geometries.

As an adjective polynomial

is (algebra) able to be described or limited by a.

As adjectives the difference between polynomial and superpolynomial

is that polynomial is (algebra) able to be described or limited by a while superpolynomial is (computing|mathematics) describing an algorithm whose execution time is not limited by a polynomial.

As a noun polynomial

is (algebra) an expression consisting of a sum of a finite number of terms, each term being the product of a constant coefficient and one or more variables raised to a non-negative integer power, such as $a\_n\; x^n\; +\; a\_\{n-1\}x^\{n-1\}\; +\; +\; a\_0\; x^0$.

As nouns the difference between polynomial and quasipolynomial

is that polynomial is (algebra) an expression consisting of a sum of a finite number of terms, each term being the product of a constant coefficient and one or more variables raised to a non-negative integer power, such as $a\_n\; x^n\; +\; a\_\{n-1\}x^\{n-1\}\; +\; +\; a\_0\; x^0$ while quasipolynomial is (mathematics) a generalization of a polynomial.

As an adjective polynomial

is (algebra) able to be described or limited by a.