" The distance between an octahedral and tetrahedral void in "FCC" lattice would be "\(\frac{\sqrt{3a}}{{b}}\)." Find the value of "b" if a is edge length of cube "
The shortest distance between an octahedral and tetrahedral void in F.C.C. metallic lattice in terms of radius of F.C.C. packed atom would be:
What is the number and closest distance between two octahedral voids and two tetrahdral voids in fcc unit cell ?
In FCC, distance between nearest tetrahedral voids is :
An element has a face-centred cubic (fcc) structure with a cell edge of a. The distance between the centres of two nearest tetrahedral voids in the lattice is:
The minimum distance between the centre of two octahedral voids in FCC lattice in terms of edge length is:
An element crystallises in a face -centred cubic (fcc) unit cell with cell edge a. The distance between the centre of two nearest octahedral voids in the crystal lattice is ::
