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| |
| #ifndef __com_sun_star_geometry_AffineMatrix2D_idl__ |
| #define __com_sun_star_geometry_AffineMatrix2D_idl__ |
| |
| module com { module sun { module star { module geometry { |
| |
| /** This structure defines a 2 by 3 affine matrix.<p> |
| |
| The matrix defined by this structure constitutes an affine mapping |
| of a point in 2D to another point in 2D. The last line of a |
| complete 3 by 3 matrix is omitted, since it is implicitely assumed |
| to be [0,0,1].<p> |
| |
| An affine mapping, as performed by this matrix, can be written out |
| as follows, where <code>xs</code> and <code>ys</code> are the source, and |
| <code>xd</code> and <code>yd</code> the corresponding result coordinates: |
| |
| <code> |
| xd = m00*xs + m01*ys + m02; |
| yd = m10*xs + m11*ys + m12; |
| </code><p> |
| |
| Thus, in common matrix language, with M being the |
| <type>AffineMatrix2D</type> and vs=[xs,ys]^T, vd=[xd,yd]^T two 2D |
| vectors, the affine transformation is written as |
| vd=M*vs. Concatenation of transformations amounts to |
| multiplication of matrices, i.e. a translation, given by T, |
| followed by a rotation, given by R, is expressed as vd=R*(T*vs) in |
| the above notation. Since matrix multiplication is associative, |
| this can be shortened to vd=(R*T)*vs=M'*vs. Therefore, a set of |
| consecutive transformations can be accumulated into a single |
| AffineMatrix2D, by multiplying the current transformation with the |
| additional transformation from the left.<p> |
| |
| Due to this transformational approach, all geometry data types are |
| points in abstract integer or real coordinate spaces, without any |
| physical dimensions attached to them. This physical measurement |
| units are typically only added when using these data types to |
| render something onto a physical output device, like a screen or a |
| printer, Then, the total transformation matrix and the device |
| resolution determine the actual measurement unit.<p> |
| |
| @since OpenOffice 2.0 |
| */ |
| published struct AffineMatrix2D |
| { |
| /// The top, left matrix entry. |
| double m00; |
| |
| /// The top, middle matrix entry. |
| double m01; |
| |
| /// The top, right matrix entry. |
| double m02; |
| |
| /// The bottom, left matrix entry. |
| double m10; |
| |
| /// The bottom, middle matrix entry. |
| double m11; |
| |
| /// The bottom, right matrix entry. |
| double m12; |
| }; |
| |
| }; }; }; }; |
| |
| #endif |
