Linear mapping/Fiber/Affine subspace/Kernel/Example
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For a linear mapping
between -vector spaces and and an element , the preimage for (the fiber over )
is an affine subspace of . If this is non-empty, then we can take any point with
as starting point The translation space is the kernel of . When a linear mapping is given, then is partitioned in a layered family of parallel affine subspaces.