answersLogoWhite

0

32

User Avatar

Immanuel Gibson

Lvl 10
4y ago

What else can I help you with?

Related Questions

Polynomials are written in what order?

Polynomials are often writen from the highest to the lowest power, for example, x3 - 3x2 + 5x + 7.Polynomials are often writen from the highest to the lowest power, for example, x3 - 3x2 + 5x + 7.Polynomials are often writen from the highest to the lowest power, for example, x3 - 3x2 + 5x + 7.Polynomials are often writen from the highest to the lowest power, for example, x3 - 3x2 + 5x + 7.


What dus subract mean?

subract mean to take a away an amount and then you have small amount left over.


All polynomials have at least one minimum?

No. For example all polynomials of the form y=xn (or sums of such positive terms) where n is a positive odd number do not have a minimum.


When you subract what is the answer called?

the differerence


Polynomials have factors that are?

Other polynomials of the same, or lower, order.


How do you find range of a set of numbers?

Subract the smallest number from the largest number. Example: 2,6,8,13,57 57-2= 55 The range is 55


What are polynomials that have factors called?

Reducible polynomials.


How polynomials and non polynomials are alike?

they have variable


What is the Answer to the pattern 1 1 -1 -3 1?

The pattern shown is add one, subract two, subract two, then add four.


Factorising two polynomials with example for std 8?

are the followimg expressions polynomials1. b squre -25


Are polynomials closed under the operations of subtraction addition and multiplication?

Yes, polynomials are closed under the operations of addition, subtraction, and multiplication. This means that when you add, subtract, or multiply two polynomials, the result is always another polynomial. For example, if ( p(x) ) and ( q(x) ) are polynomials, then ( p(x) + q(x) ), ( p(x) - q(x) ), and ( p(x) \cdot q(x) ) are all polynomials as well. However, polynomials are not closed under division, as dividing one polynomial by another can result in a non-polynomial expression.


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