| 1. | Examples include linear transformations and affine transformations, rotations, matrices.
|
| 2. | The linear transformation in this example is called a shear mapping.
|
| 3. | Odd supermatrices correspond to linear transformations that reverse the grading.
|
| 4. | As a linear transformation, every special orthogonal matrix acts as a rotation.
|
| 5. | So use the inverse transpose of the linear transformation when transforming surface normals.
|
| 6. | Following his suggestion, Molien started to study linear transformations of elliptic functions.
|
| 7. | Conversely, the fractional linear transformations are the only functions with this property.
|
| 8. | Linear transformations are not the only ones that can be represented by matrices.
|
| 9. | Furthermore, linear transformations can be represented using matrices,
|
| 10. | The binomial transform is another linear transformation of a still more general type.
|
मोबाइल