Examples of 'polynomials' in a sentence
Meaning of "polynomials"
Polynomial is a mathematical expression consisting of variables and coefficients, involving addition, subtraction, multiplication, and non-negative integer exponents. It is used in algebra and calculus to solve mathematical equations and model real-world scenarios
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- plural of polynomial
How to use "polynomials" in a sentence
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polynomials
She probably does polynomials in her bath to unwind.
Polynomials are of bounded type in any bounded region.
The set of binary polynomials is a mathematical ring.
Polynomials that are not inseparable are said to be separable.
These invariants are polynomials on the second homology.
The polynomials q and r are uniquely determined by f and g.
Here we have two polynomials once again.
Polynomials have more than one term.
Of the numerator polynomials in the transfer function.
Polynomials orthogonal on with the weight function.
Constructing irreducible polynomials over finite fields.
Polynomials are simply the sum of a group monomials.
Several orthogonal polynomials and special functions are.
Polynomials can not contain negative exponents.
The simplest polynomials have one variable.
See also
Polynomials can not contain division by a variable.
Then by storing all polynomials in a single array.
This family is an ideal in the ring of polynomials.
On difference polynomials and hereditarily irreducible polynomials.
Quadratic forms are homogeneous quadratic polynomials in n variables.
Homogeneous polynomials are ubiquitous in mathematics and physics.
On the problem of local triviality of real polynomials.
Homogeneous polynomials also define homogeneous functions.
We have not really done much with polynomials.
Be two polynomials with integer coe cients.
Now let us do a couple of operations with polynomials.
The first four polynomials are easily calculated as.
There are several generalizations of the concept of polynomials.
The simplest polynomials consist of one variable.
All the other subresultant polynomials are zero.
The ring of polynomials of several variables over a field.
In practice a continuous function can be approximated by polynomials.
This is case for polynomials for example.
Some constraints are needed on the polynomials.
Irreducible polynomials over the field of rational numbers.
Such operators preserve the degree of polynomials.
So different powers of polynomials do not collapse.
I am going to be fitting higher and higher order polynomials.
Similarities to cyclotomic polynomials have also been pointed out.
Basis functions are linear or higher order polynomials.
Rook polynomials are an example of an application in combinatorics.
The product of two monic polynomials is monic.
Schur polynomials are indexed by integer partitions.
It is the generalization of the binomial theorem to polynomials.
Minimal polynomials are also used to define conjugate elements.
We then study transitive locally expanding polynomials.
The explicit form of these polynomials is of some importance.
The denominator is the sum of two polynomials.
Such polynomials occur naturally in several standard problems.
Finding real and complex roots of polynomials.
