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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 33</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"><img src="f671b3e5d0617508f640d3c62aeeed42.gif" border="0" alt="0033-01.GIF" width="276" height="162" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">Equation (2.16) is the vector transformation between coordinate systems. This relation is valid for any vector quantity. As discussed in detail in Ref. 111, it is important to realize that vectors, vector operations, and relations among vectors are invariant relative to any two particular coordinate representations as long as the coordinate systems are related through Eq. (2.16). This is important, as it corresponds to the intuitive notion that the physical properties of a system are invariant no matter how we orient the coordinate system in which our analysis is performed.</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">In the discussion of this section, the roles of time and relative motion (uniform or accelerated) of the coordinate systems have been neglected. These two issues will be critically important in navigation systems and are discussed in subsequent sections.</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">2.4<br />
Vector Transformations</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">In Sec. 2.3, the transformation of vectors between coordinate systems was shown to involve an orthonormal matrix denoted by R. The elements of this matrix, called the direction-cosine matrix, were the cosines of the angles between the coordinate axis of the two frames of reference. Although this appears to allow nine independent variables to define R, orthonormality restrictions result in only three independent quantities. In Sec. 2.4.1 the concept of a plane rotation is introduced. In the subsections of Secs. 2.4.1 plane rotations are used to define the transformation between orthogonal coordinate systems by three parameters (i.e., Euler angles). In Sec. 2.4.2 quaternions are introduced and algorithms for calculating the transformation matrix R from the quaternion b are presented.</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><i>2.4.1<br />
Plane Rotations</i></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">Plane rotations are a convenient means for mathematically expressing the rotational transformation of vectors between two coordinate systems in which the second coordinate system is related to the first by a rotation of the first coordinate system by an angle <i>x</i> around a vector v. In the special case in which the vector v is one of the original coordinate axes, the plane-rotation matrix takes</font><font face="Times New Roman, Times, Serif" size="3" color="#FFFF00"></font></td>
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