Reflection (mathematics) - Reflection Across A Line in The Plane

Reflection Across A Line in The Plane

Reflection across a line through the origin in two dimensions can be described by the following formula

Where v denotes the vector being reflected, l denotes any vector in the line being reflected in, and v·l denotes the dot product of v with l. Note the formula above can also be described as

Where the reflection of line l on a is equal to 2 times the projection of v on line l minus v. Reflections in a line have the eigenvalues of 1, and −1.

Read more about this topic:  Reflection (mathematics)

Famous quotes containing the words reflection, line and/or plane:

    Much of what passes for quality on British television is no more than a reflection of the narrow elite which controls it and has always thought that its tastes were synonymous with quality.
    Rupert Murdoch (b. 1931)

    I love them
    for finding what
    I can’t find,
    and for loving me
    for the line I wrote,
    and for forgetting it....
    Denise Levertov (b. 1923)

    At the moment when a man openly makes known his difference of opinion from a well-known party leader, the whole world thinks that he must be angry with the latter. Sometimes, however, he is just on the point of ceasing to be angry with him. He ventures to put himself on the same plane as his opponent, and is free from the tortures of suppressed envy.
    Friedrich Nietzsche (1844–1900)