Question
Simplify the polynomial, if possible, and write it with descending powers. Then give the degree of the resulting polynomial, and tell whether it is a monomial, a binomial, a trinomial, or none of these. \( 3 x^{3}-7 x \) Select the correct choice below and fill in the answer box to complete your choice. A. The polynomial cannot be simplified. The polynomial written in descending powers is B. The polynomial can be simplified. \( 3 x^{3}-7 x=\square \)
Ask by Clarke Bowman. in the United Arab Emirates
Mar 16,2025
Upstudy AI Solution
Tutor-Verified Answer
Answer
The polynomial cannot be simplified further. It is written in descending powers as \(3x^{3}-7x\).
Solution
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Beyond the Answer
B. The polynomial can be simplified. \( 3 x^{3}-7 x=3 x^{3}-7 x \) The polynomial is already in its simplest form. It is written in descending powers as \( 3 x^{3}-7 x \). The degree of this polynomial is 3, which is determined by the term with the highest power, \( x^{3} \). Since it has two terms, it qualifies as a binomial.
