How do you write a polynomial in standard form?


Writing a polynomial in standard form means putting the term with the highest exponent first. The other terms with lower exponents are written in descending order.

An example of a polynomial in standard form is x^8 + 2 x^6 + 4 x^3 + 2x^2 + 3x - 2. In this example, there are terms with exponents and a constant. In the given polynomial, "x" is a variable, and the term "x^8" has the highest exponent, which is 8. This is also called the degree of the polynomial. The next term that follows is "2x ^6," which has the lower exponent of 6. The other terms in this polynomial are in descending order when looking at the exponents.

When writing a polynomial in standard form, it is important to look at each term to identify the exponents from highest to lowest correctly. The constant term, a number by itself, goes last in the standard form of polynomials.

Q&A Related to "How do you write a polynomial in standard form..."
1. Expand the parenthesis terms. For example, expand the polynomial 2x(2 + 4x) to 4x + 8x^2. 2. Bring the terms over to the left-hand side of the equation and set it to zero. Remember
To write the standard form a number in math, you take the expanded form of the number and write it in its normal way. For example, 3000+200+70+5=3,275.
Expand it out. the first term (3x^2) gets multiplied out to every term in the bracket. terms are separated by addition/subtraction. You will have: 3x^2(2x^2) + 3x^2(5x) + 3x^2(2)
A polynomial that is written in standard form is written from highest
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