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1. The central dot of the four is at distance 식1 from each of the other three dots, as projected onto the basal plane. If the (unprojected)dots are at the center of spheres in contact, then 식2 or 식3.
2. The crystal plane with Miller indices "hkl" is a plane defined by the points 식1, 식2, and 식3.
(a) Two vectors that lie in the plane may be taken as 식1 and 식2. But each of these vectors gives zero as its scalar product with 식1, so that 식2 must be perpendicular to the plane "hkl".
(b) If 식1 is the unit normal to the plane, the interplanar spacing is 식2. But 식1, whence 식2.
(c) For a simple cubic lattice 식1, whence 식2.
3. Six vectors in the reciprocal lattice are shown as solid lines. The broken lines are the perpendicular bisectors at the midpoints. The inscribed hexagon forms the first Brillouin Zone.
4. Referred to an fcc lattice, the basis of diamond is 식1. Thus in the product 식1, we take the lattice structure factor from (48), and for the basis 식2.
Now 식1 only if all indices are even the structure factor of the basis vanishes unless 식2, where 식3 is an integer. For example, for the reflecion (222) we have 식1, and this reflection is forbidden.
고체물리학에서 나오는 것들인데 전문용어가 좀 많지만 부탁드립니다.
번역기 말고 부탁드립니다..
1. The central dot of the four is at distance 식1 from each of the other three dots, as projected onto the basal plane. If the (unprojected)dots are at the center of spheres in contact, then 식2 or 식3.
2. The crystal plane with Miller indices "hkl" is a plane defined by the points 식1, 식2, and 식3.
(a) Two vectors that lie in the plane may be taken as 식1 and 식2. But each of these vectors gives zero as its scalar product with 식1, so that 식2 must be perpendicular to the plane "hkl".
(b) If 식1 is the unit normal to the plane, the interplanar spacing is 식2. But 식1, whence 식2.
(c) For a simple cubic lattice 식1, whence 식2.
3. Six vectors in the reciprocal lattice are shown as solid lines. The broken lines are the perpendicular bisectors at the midpoints. The inscribed hexagon forms the first Brillouin Zone.
4. Referred to an fcc lattice, the basis of diamond is 식1. Thus in the product 식1, we take the lattice structure factor from (48), and for the basis 식2.
Now 식1 only if all indices are even the structure factor of the basis vanishes unless 식2, where 식3 is an integer. For example, for the reflecion (222) we have 식1, and this reflection is forbidden.
고체물리학에서 나오는 것들인데 전문용어가 좀 많지만 부탁드립니다.
번역기 말고 부탁드립니다..
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