**24+ Sketch Within A Cubic Unit Cell The Following Planes:
Images**. For plane a we will leave the origin at the unit cell as shown; Determine the miller indices for the planes shown in the following unit cell:

H = 1 k = 0 l = 1 thus, we solve for the a , b , and c intercepts using rearranged equations 3.14 as follows (assuming that n = 1): Braquium (bq) is simple cubic. Within a cubic unit cell, sketch the following directions 14.

### Sketch the (311) plane within a cubic cell and identify the intercepts (calculate also numerically the 3) intercept of the (311) plane) sketch the (311) plane within a cubic problem 5.

Sketch the (311) plane within a cubic cell and identify the intercepts (calculate also numerically the 3) intercept of the (311) plane) sketch the (311) plane within a cubic problem 5. It may be noted that only 1/2 of each face sphere lies within the unit cell and there are six such faces. 3.12 within a cubic unit cell, sketch the following directions the planes called for are plotted in the cubic unit cells shown below. The planes called for are plotted in the cubic unit cells shown below.