A lattice plane makes intercepts of 2a, 3
and 6c along the three axes where à. b and a
are primitive vectors of the unit cell. The
Miller indices of the given plane are
a. (1 2 3)
b. (132)
d. (312)
Answers
Explanation:
Rules for Miller Indices:
Rules for Miller Indices:1. Determine the intercepts of the face along the crystallographic axes, in terms of unit cell dimensions.
Rules for Miller Indices:1. Determine the intercepts of the face along the crystallographic axes, in terms of unit cell dimensions.2. Take the reciprocals of the coefficients of the intercept
Rules for Miller Indices:1. Determine the intercepts of the face along the crystallographic axes, in terms of unit cell dimensions.2. Take the reciprocals of the coefficients of the intercept3. Clear fractions
Rules for Miller Indices:1. Determine the intercepts of the face along the crystallographic axes, in terms of unit cell dimensions.2. Take the reciprocals of the coefficients of the intercept3. Clear fractions4. Reduce to the lowest integer
Rules for Miller Indices:1. Determine the intercepts of the face along the crystallographic axes, in terms of unit cell dimensions.2. Take the reciprocals of the coefficients of the intercept3. Clear fractions4. Reduce to the lowest integerTaking reciprocal of the coefficient-
Rules for Miller Indices:1. Determine the intercepts of the face along the crystallographic axes, in terms of unit cell dimensions.2. Take the reciprocals of the coefficients of the intercept3. Clear fractions4. Reduce to the lowest integerTaking reciprocal of the coefficient-We get-
Answer:
A lattice plane makes intercepts of 2a, 3
and 6c along the three axes where à. b and a
are primitive vectors of the unit cell. The
Miller indices of the given plane are
a. (1 2 3)
b. (132)
d. (312)✔✔✔✔✔✔✔✔