Textbook Question
Is the algebraic expression a polynomial? If it is, write the polynomial in standard form. (2x+3)/x
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0. Review of Algebra
Polynomials Intro
3:16 minutesProblem 30
Textbook Question
In Exercises 15–58, find each product. (7x3+5)(x2−2)
Verified step by step guidance1
Distribute the first term of the first polynomial, \(7x^3\), to each term in the second polynomial \((x^2 - 2)\). This gives \(7x^3 \cdot x^2\) and \(7x^3 \cdot (-2)\).
Simplify the results of the first distribution: \(7x^3 \cdot x^2 = 7x^5\) and \(7x^3 \cdot (-2) = -14x^3\).
Distribute the second term of the first polynomial, \(5\), to each term in the second polynomial \((x^2 - 2)\). This gives \(5 \cdot x^2\) and \(5 \cdot (-2)\).
Simplify the results of the second distribution: \(5 \cdot x^2 = 5x^2\) and \(5 \cdot (-2) = -10\).
Combine all the terms from the distributions: \(7x^5 - 14x^3 + 5x^2 - 10\). This is the expanded form of the product.
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Video duration:
3mKey Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Polynomial Multiplication
Polynomial multiplication involves distributing each term in one polynomial to every term in another polynomial. This process is often referred to as the distributive property, where you multiply each term in the first polynomial by each term in the second. For example, in the expression (7x^3 + 5)(x^2 - 2), you would multiply 7x^3 by both x^2 and -2, and then multiply 5 by both x^2 and -2.
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Combining Like Terms
After multiplying polynomials, the next step is to combine like terms, which are terms that have the same variable raised to the same power. This simplification is crucial for expressing the final result in its simplest form. For instance, if the multiplication yields terms such as 7x^5, -14x^3, and 5x^2, you would ensure that all similar terms are added or subtracted accordingly.
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Degree of a Polynomial
The degree of a polynomial is the highest power of the variable in the polynomial expression. Understanding the degree is important because it helps in determining the behavior of the polynomial function, such as its end behavior and the number of roots. In the given expression, the degree of the resulting polynomial after multiplication will be the sum of the degrees of the individual polynomials, which influences the overall shape of the graph.
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