Question1. (a) Determine the Miller indices for the planes shown in the following cubic unit cells:
Question1. (a) Determine the Miller indices for the planes shown in the following cubic unit cells:
the Miller indices for the planes 3.24 Determine the Miller indices 3 shown in the following unit cell: sogon 3.28 D gumupa gniu el. TA= (124) - w - - - Sidan oncle ) Bl o ? -- B - > +y -coon) WISE Žollol od
Q3. Identify the following set of planes in terms of Miller indices. Determine the interplanar spacing in terms of the cubic unit cell lattice constant- a.
In the unit cells above, determine the directional indices of the vector, and the Miller Indices of the plane (4 marks) If the atomic packing factor of a material is known to be 0.5 and there are 5 atoms per unit cell (atomic radius 0.13nm), what is the lattice parameter of the cubic unit cell (3 marks) Which two of the following atoms would be most likely to combine and form a covalent bond, and briefly explain why (2 marks)...
Determine the miller indices for the planes shown. Should define x, y, z axes. 2. Determine the Viller indices for the planes shown in below (Fig. Ik (6%) should define x, y, zaves.
Determine the Miller-Bravais indices of the planes shown below b -a2 a2 ai -dz
For the cubic systems given in the figures below, find a) Miller indices for the directions indicated by the vectors A, B, C, D b) Miller indices for four different planes. Explain how you found the results. 4-5)
2. What are the Miller indices for the planes shown below? a. X b. C.X
Simple Cubic (SC) Structure 1. Write the Miller indices for the family of close-packed directions in the SC crystal. <hkl>= 2. Write the expression for theoretical density of a material with SC structure in terms of atomic radius (R), atomic weight (A), and Avogadro's number (NA). (Show your work.) 3. Calculate the planar density for the most densely packed SC planes in terms of atomic radius (R). (Show your work.) PD Body-Centered Cubic (BCC) Structure 4. How many non-parallel close-packed...
Draw in unit cubes the crystal planes that have the following Miller indices: (b) (102) (e (iž1) (d) (213) (e) (321) ( (302) (g) (201) (h) (212) () (232)
SECTION C (15 Marks) 1. Determines the Miller indices of directicns and planes as shown in the Figures 1 & 2 below C Figure 1 o 2 A - B Figure 2 SECTION C (15 Marks) 1. Determines the Miller indices of directicns and planes as shown in the Figures 1 & 2 below C Figure 1 o 2 A - B Figure 2