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this book can help you to get a better performance in the gps development

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<p></p><table border="0" cellspacing="0" cellpadding="0" width="100%"><tr><td align="right"><font face="Times New Roman, Times, Serif" size="2" color="#FF0000">Page 86</font></td></tr></table><table border="0" cellspacing="0" cellpadding="0"><tr><td rowspan="5"></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">where D is a dummy variable representing a portion of the answer that will not be used. Therefore, from e</font><font face="Symbol" size="2"><sup>X</sup></font><font face="Symbol" size="2"><sup></sup></font><font face="Times New Roman, Times, Serif" size="3">, </font><font face="Symbol" size="3">F</font><font face="Times New Roman, Times, Serif" size="3"> and Q</font><font face="Times New Roman, Times, Serif" size="1"><sub>d</sub></font><font face="Times New Roman, Times, Serif" size="1"><sub></sub></font><sub><font face="Symbol" size="1">w</font></sub><font face="Symbol" size="1"></font><font face="Times New Roman, Times, Serif" size="3"> are calculated as</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="6a7976cd3bafebd2cd7a7f21efa19cd6.gif" border="0" alt="0086-01.GIF" width="335" height="19" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="feeb8a1ced6ccd1f9463d7554aa109c2.gif" border="0" alt="0086-02.GIF" width="349" height="20" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">where </font><font face="Symbol" size="3">隆</font><font face="Times New Roman, Times, Serif" size="3">[(<i>i : j</i>), (<i>k : l</i>)] denotes the the submatrix of </font><font face="Symbol" size="3">隆</font><font face="Times New Roman, Times, Serif" size="3"> composed of the <i>i</i>th through <i>j</i>th rows and <i>k</i>th through <i>l</i>th columns of matrix </font><font face="Symbol" size="3">隆</font><font face="Times New Roman, Times, Serif" size="3">.</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">Numerous methods for calculating matrix exponentials are analyzed in Ref. 113.</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">3.4.3.2<br />
Solution by Taylor Series</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">If the Taylor series 1approximation for </font><font face="Symbol" size="3">F</font><font face="Times New Roman, Times, Serif" size="3">,</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="245dc0a0b618e570fae50d36ddc42356.gif" border="0" alt="0086-03.GIF" width="369" height="36" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">is substituted into Eq. (3.144), the result accurate to third order in <i>A</i> and fourth order in <i>T</i> is</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="53195414b3c76722f1e4a1d02d01e67f.gif" border="0" alt="0086-04.GIF" width="485" height="77" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">Although the Taylor series approach is not optimal for numeric implementations, Approx. (3.151) is sometimes used as a convenient means to identify a closed-form solution for either </font><font face="Symbol" size="3">F</font><font face="Times New Roman, Times, Serif" size="3"> or Q</font><font face="Times New Roman, Times, Serif" size="1"><sub>d</sub></font><font face="Times New Roman, Times, Serif" size="1"><sub></sub></font><font face="Times New Roman, Times, Serif" size="3">. Even an approximate solution in closed form such as Approx. (3.151) is useful in situations in which F is time dependent and Eqs. (3.147)(3.149) cannot be solved on line.</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="2">Example Assume that, for a system of interest,</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="17885a1629bc37112a89e2d745550ad3.gif" border="0" alt="0086-05.GIF" width="296" height="60" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="2">and that the (possibly, appropriately sized matrix) terms denoted by F</font><font face="Times New Roman, Times, Serif" size="1"><sub>12</sub></font><font face="Times New Roman, Times, Serif" size="2">, F</font><font face="Times New Roman, Times, Serif" size="1"><sub>23</sub></font><font face="Times New Roman, Times, Serif" size="2">, and F</font><font face="Times New Roman, Times, Serif" size="1"><sub>33</sub></font><font face="Times New Roman, Times, Serif" size="2"> can be considered to be constant over the interval <i>t</i> </font><font face="Symbol" size="2">脦</font><font face="Times New Roman, Times, Serif" size="2"> [<i>t</i></font><font face="Times New Roman, Times, Serif" size="1"><sub>1</sub></font><font face="Times New Roman, Times, Serif" size="2"><i>, t</i></font><font face="Times New Roman, Times, Serif" size="1"><sub>2</sub></font><font face="Times New Roman, Times, Serif" size="2">]. Then </font><font face="Symbol" size="2">F</font><font face="Times New Roman, Times, Serif" size="2">(<i>t</i></font><font face="Times New Roman, Times, Serif" size="1"><sub>2</sub></font><font face="Times New Roman, Times, Serif" size="2">, <i>t</i></font><font face="Times New Roman, Times, Serif" size="1"><sub>1</sub></font><font face="Times New Roman, Times, Serif" size="2">) = <i>e</i><sup>F<i>T</i></sup> where <i>T</i> = <i>t</i></font><font face="Times New Roman, Times, Serif" size="1"><sub>2</sub></font><font face="Times New Roman, Times, Serif" size="2"> - <i>t</i></font><font face="Times New Roman, Times, Serif" size="1"><sub>1</sub></font><font face="Times New Roman, Times, Serif" size="2">. Expanding the Taylor series of</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="5ae45202172d4437ad53b2a6ebf3eac8.gif" border="0" alt="0086-06.GIF" width="138" height="32" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="2">is straightforward, but tedious. The result is</font><font face="Times New Roman, Times, Serif" size="2" color="#FFFF00"></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="cbe623fa41341fe087994d1339938116.gif" border="0" alt="0086-07.GIF" width="572" height="99" /></font></td>
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