| 1. | The term partial fraction is used when decomposing rational expressions into sums.
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| 2. | This approach gives rise to weighted rational expressions and weighted automata.
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| 3. | Students learn to how write, solve, and graph equations and radicals, and rational expressions.
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| 4. | Rational expressions are the quotient field of the polynomials ( over some integral domain ).
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| 5. | This applies notably to rational expressions over a field.
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| 6. | In Math A, students learn to how write, solve, and graph equations and radicals, and rational expressions.
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| 7. | Any equation containing fractions or rational expressions can be simplified by multiplying both sides by the least common denominator.
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| 8. | The goal is to write the rational expression as the sum of other rational expressions with denominators of lesser degree.
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| 9. | The goal is to write the rational expression as the sum of other rational expressions with denominators of lesser degree.
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| 10. | In this algebraic context, the regular languages ( corresponding to Boolean-weighted rational expressions ) are usually called " rational languages ".
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