| 31. | Taking rational functions with rational instead of real coefficients produces a countable non-Archimedean ordered field.
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| 32. | Approximations in terms of rational functions are well suited for computer algebra systems and other numerical software.
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| 33. | One then expects that the " circular functions " should be reducible to rational functions.
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| 34. | This allows us to write the latter as rational functions of ( solutions are given below ).
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| 35. | If it did, then there would be a rational function whose-th power would equal.
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| 36. | List of integrals of rational functions should be completely rewritten and moved to integration of rational functions.
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| 37. | List of integrals of rational functions should be completely rewritten and moved to integration of rational functions.
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| 38. | Thereby one converts rational functions of and to rational functions of in order to find their antiderivatives.
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| 39. | Thereby one converts rational functions of and to rational functions of in order to find their antiderivatives.
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| 40. | Where and are polynomials, i . e . a rational function in trigonometric terms is being integrated.
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