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Which operation between two polynomials will not always result in a polynomial?
Division of one polynomial by another one.
How polynomials and non polynomials are alike?
they have variable
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.
Are polynomials used in cooking?
nope
What operations is not closed for polynomials?
division
When factoring polynomials under what circumstances do you change the operation?
you dont
What math properties allows you to change the order of operation when multiplying polynomials?
The property is called commutativity.
Polynomials have factors that are?
Other polynomials of the same, or lower, order.
Which operation between two polynomials will not always result in a polynomial?
Division of one polynomial by another one.
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
What is a jocobi polynomial?
In mathematics, Jacobi polynomials (occasionally called hypergeometric polynomials) are a class of classical orthogonal polynomials.
What is the process to solve multiplying polynomials?
what is the prosses to multiply polynomials
Where did RenΓ© Descartes invent polynomials?
Descartes did not invent polynomials.
How alike the polynomials and non polynomials?
how alike the polynomial and non 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
