See Also
- Inner-product space
- Hilbert space
- Euclidean space
- Orthogonality
- Orthonormal basis
- Orthogonal complement, the closed subspace orthogonal to a set (especially a subspace)
- Orthomodular lattice of the subspaces of an inner-product space
- Orthogonal projection
- Pythagorean theorem that the sum of the squared norms of orthogonal summands equals the squared norm of the sum.
- Hilbert space
- Least squares
- Mean squared error
- Squared deviations
Read more about this topic: Partition Of Sums Of Squares
Famous quotes containing the word see:
“To see ourselves as others see us can be eye-opening. To see others as sharing a nature with ourselves is the merest decency. But it is from the far more difficult achievement of seeing ourselves amongst others, as a local example of the forms human life has locally taken, a case among cases, a world among worlds, that the largeness of mind, without which objectivity is self- congratulation and tolerance a sham, comes.”
—Clifford Geertz (b. 1926)