| 1. | The dominant term of the local truncation error can be discovered.
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| 2. | See Truncation error ( numerical integration ) for more on this.
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| 3. | We therefore have a truncation error of 0.01.
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| 4. | The main causes of error are round-off error and truncation error.
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| 5. | An expression of general interest is the local truncation error of a method.
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| 6. | The effect of rounding / truncation errors can be reduced by using larger registers.
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| 7. | The local truncation error of the Euler method is error made in a single step.
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| 8. | The remainder term of a Taylor polynomial is convenient for analyzing the local truncation error.
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| 9. | The global truncation error is the cumulative effect of the local truncation errors committed in each step.
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| 10. | The global truncation error is the cumulative effect of the local truncation errors committed in each step.
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