QUESTION IMAGE
Question
consider the following polynomial:
\\x^4 - 5x + 2x^3 + x^2 - 9\\
the coefficient of the linear term is
the coefficient of the quadratic term is
the coefficient of the cubic term is
🆕 New Concept Discovered: Polynomial Terms and Coefficients
Identifying parts of a polynomial by their degree.
Step 1: Identify the linear term
The linear term is the term where the variable \(x\) has an exponent of 1 (written simply as \(x\)).
In the polynomial \(x^4 - 5x + 2x^3 + x^2 - 9\), the linear term is:
\[-5x\]
The coefficient is the number multiplying the variable, including its sign:
\[-5\]
Step 2: Identify the quadratic term
The quadratic term is the term where the variable \(x\) is raised to the power of 2 (\(x^2\)).
In the polynomial, the quadratic term is:
\[x^2\]
Since there is no visible number in front of \(x^2\), its coefficient is understood to be:
\[1\]
Step 3: Identify the cubic term
The cubic term is the term where the variable \(x\) is raised to the power of 3 (\(x^3\)).
In the polynomial, the cubic term is:
\[2x^3\]
The coefficient of this term is:
\[2\]
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- The coefficient of the linear term is -5
- The coefficient of the quadratic term is 1
- The coefficient of the cubic term is 2