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Q: To write a polynomial in standard form write the exponents of the in descending order?

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I think something's missing, but the answer is x(6x - 13)

(x + 2)(x - 8)

(2x + 5)(6x - 5)

In the 1880s, Poincaré created functions which give the solution to the order polynomial equation to the order of the polynomial equation

If the polynomial is in terms of the variable x, then look for the term with the biggest power (the suffix after the x) of x. That term is the leading term. So the leading term of x2 + 5 + 4x + 3x6 + 2x3 is 3x6 If you are likely to do any further work with the polynomial, it would be a good idea to arrange it in order of the descending powers of x anyway.

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Powers of their exponents

It is written in descending order.

x^2 + 10x + 9 = (x + 9)(x + 1)

Factor the polynomial x2 - 10x + 25. Enter each factor as a polynomial in descending order.

The polynomial IS written in descending order.

descending

descending form

A polynomial in standard form is when it is written in descending order according to the highest alphabetical variable according to power. In other words the powers of the variable first in the alphabet from greatest to least. So 3a^3+4a^2-1a. ( notice the peers of a )

Each power should appear only once (for example, only one term which contains x cubed); the powers should be in descending order.

That one, there!

(x + 8)(x + 1)

(x-2)(x-3)