QUESTION IMAGE
Question
consider the following polynomial:
\\6x + 5x^4 - 10x + 8x^3 - 7x^2 + 9^2\\
written in standard form, the polynomial has \\(\text{______}\\) terms.
the constant term is \\(\text{______}\\).
in standard form, the coefficient of the linear term is \\(\text{______}\\).
🆕 New Concept Discovered: Polynomials in Standard Form
Ordering terms from highest degree to lowest
Step 1: Combine like terms
To write the polynomial in standard form, we first simplify it by combining any like terms.
Given polynomial:
\[ 6x + 5x^4 - 10x + 8x^3 - 7x^2 + 9^2 \]
Identify the like terms:
- The terms with \( x \) are \( 6x \) and \( -10x \).
- Combine them: \( 6x - 10x = -4x \).
Simplify the constant term:
- \( 9^2 = 81 \)
The simplified terms are:
\[ 5x^4, \quad 8x^3, \quad -7x^2, \quad -4x, \quad 81 \]
Step 2: Write in standard form
Standard form means writing the terms in descending order of their exponents (from highest to lowest degree).
\[ 5x^4 + 8x^3 - 7x^2 - 4x + 81 \]
Step 3: Identify the polynomial features
- Number of terms: Count the distinct terms separated by addition or subtraction in the simplified standard form:
\[ 5x^4, \quad 8x^3, \quad -7x^2, \quad -4x, \quad 81 \]
There are \( 5 \) terms.
- Constant term: The term without any variable \( x \):
\[ 81 \]
- Coefficient of the linear term: The linear term is the term with \( x^1 \) (or simply \( x \)), which is \( -4x \). Its coefficient is:
\[ -4 \]
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- Written in standard form, the polynomial has 5 terms.
- The constant term is 81.
- In standard form, the coefficient of the linear term is -4.