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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 315</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="4">Appendix D<br />
Numeric Integration</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">The derivation of the INS equations in Chap. 6 result in equations of the form</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="56fd592414c8ff7d9875f8fda83fc308.gif" border="0" alt="0315-01.GIF" width="299" height="23" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">In this appendix methods are presented for numerically integrating the differential equations between two instants of time <i>t</i></font><font face="Times New Roman, Times, Serif" size="1"><sub>0</sub></font><font face="Times New Roman, Times, Serif" size="3"> and <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="3">. It is assumed that the state x(<i>t</i></font><font face="Times New Roman, Times, Serif" size="1"><sub>0</sub></font><font face="Times New Roman, Times, Serif" size="3">) is known. The vector u represents the inputs such as the processed specific force measurements.</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">In the algorithms that follow, the inertial measurements are available at various instants of time. They are, however, available at only one time instant for each interval of integration. Therefore the equations are written by using the constant initial value of u(<i>t</i></font><i><font face="Times New Roman, Times, Serif" size="1"><sub>k</sub></font></i><font face="Times New Roman, Times, Serif" size="1"><sub></sub></font><font face="Times New Roman, Times, Serif" size="3">) in all evaluations of g in the propagation from <i>t</i></font><i><font face="Times New Roman, Times, Serif" size="1"><sub>k</sub></font></i><font face="Times New Roman, Times, Serif" size="1"><sub></sub></font><font face="Times New Roman, Times, Serif" size="3"> to <i>t</i></font><i><font face="Times New Roman, Times, Serif" size="1"><sub>k</sub></font></i><font face="Times New Roman, Times, Serif" size="1"><sub>+1</sub></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">D.1<br />
Euler Integration</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">By the definition of the derivative,</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="df8e867f49441a9a16da388631d14c4a.gif" border="0" alt="0315-02.GIF" width="170" height="43" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">Therefore, for small </font><font face="Symbol" size="3">D</font><font face="Times New Roman, Times, Serif" size="3"><i>t</i>,</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="23d28d5ac5637ce31c3cb6ccd7d4ab54.gif" border="0" alt="0315-03.GIF" width="365" height="35" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="9b5c4de7fd204f013afbac211dc8344a.gif" border="0" alt="0315-04.GIF" width="326" height="22" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">Written in terms of sampling times,</font><font face="Times New Roman, Times, Serif" size="3" color="#FFFF00"></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="6f938374b09d07b4cd0f95d40f1ac647.gif" border="0" alt="0315-05.GIF" width="345" height="25" /></font></td>
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