| 21. | The first graph in this section shows the relative error vs ., for 1 through all 5 terms listed above.
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| 22. | Neglecting the virtual temperature correction may result in substantial relative errors in the calculated value of CAPE for small CAPE values.
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| 23. | For a number system and a rounding procedure, machine epsilon is the maximum relative error of the chosen rounding procedure.
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| 24. | Firstly, relative error is undefined when the true value is zero as it appears in the denominator ( see below ).
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| 25. | The system is very lax with rounding and accepts any answer as long as the relative error is below a few percent.
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| 26. | The relative error in T is larger than might be reasonable so that the effect of the bias can be more clearly seen.
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| 27. | In exact terms the power ratio is 10, or about 3.9811, a relative error of about 0.5 %.
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| 28. | Instead, the theorem states that } } approximates in the sense that the relative error of this approximation approaches 0 as increases without bound.
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| 29. | Lattice parameters of high accuracy can in fact be obtained from electron diffraction, relative errors less than 0.1 % have been demonstrated.
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| 30. | The denominator in the relative error is the number being rounded, which should be as small as possible to make the relative error large.
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