Question
\( x^{\wedge} 6-8 x^{\wedge} 4+2 x^{\wedge} 3-3 x+10 \) Arrange in ascending order
Ask by Frank Schofield. in South Africa
Mar 17,2025
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Answer
Arrange the polynomial in ascending order: \( 10 - 3x + 2x^3 - 8x^4 + x^6 \).
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Beyond the Answer
To arrange the polynomial \( x^{\wedge} 6 - 8 x^{\wedge} 4 + 2 x^{\wedge} 3 - 3 x + 10 \) in ascending order, we need to list the terms starting from the lowest degree to the highest. The terms are as follows: 1. \( 10 \) (constant term, degree 0) 2. \( -3x \) (degree 1) 3. \( 2x^{\wedge} 3 \) (degree 3) 4. \( -8x^{\wedge} 4 \) (degree 4) 5. \( x^{\wedge} 6 \) (degree 6) So, in ascending order, the polynomial can be rearranged as: \[ 10 - 3x + 2x^{\wedge} 3 - 8x^{\wedge} 4 + x^{\wedge} 6. \]
