The interplanar spacing d_{hkl} for lattice planes with Miller indices (hkl) in a crystal lattice is equal to the reciprocal of the norm of n perpendicular to the (hkl) lattice planes
For all orthogonal crystal systems (orthorhombic, tetragonal, cubic) the interplanar distance of a lattice plane with Miller indices is: d=1./sqrt(h^2/a^2 + k^2/b^2 + l^2/c^2). This holds for each of the possible Bravais lattices in these systems.
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The interplanar spacing d_{hkl} for lattice planes with Miller indices (hkl) in a crystal lattice is equal to the reciprocal of the norm of n perpendicular to the (hkl) lattice planes
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For all orthogonal crystal systems (orthorhombic, tetragonal, cubic) the interplanar distance of a lattice plane with Miller indices is: d=1./sqrt(h^2/a^2 + k^2/b^2 + l^2/c^2). This holds for each of the possible Bravais lattices in these systems.
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