CsBr has bcc like structures with edge length `4.3Å`. The shortest inter ionic distance in between `Cs^(+)` and `Br^(-)` is:

A crystal of lead (II) sulphide has NaCl structure . In this crystal the shortest distance between a Pb^(2+) ion and S^(2-) ion is 297 pm . What is the volume the of unit cell in lead sulphide ?

CsCl has bcc structure with Cs^(+) at the centre and Cl^(-) ion at each corner. If r_(Cs^(+)) is 1.69Å and r_(Cl^(-)) is 1.81Å what is the edge length of the cube?

Metallic gold crystallises in face centred cubic lattice with edge-length 4.07Å . Closest distance between gold atoms is:

A compound AB crystallines in bcc lattice with unit cell edge length of 380 pm. Calculate the distance between oppositely charged ions in the lattice.

An element 'X' has bcc lattice as shown below: The unit cell length a is 306pm What is the distance between nearest neighbours?

Crystalline CsBr has a body centred cubic structure. Calculate the unit cell edge length if the density of CsBr crystal is 4.24 g cm^-3 . (atomic masses: cs=133, Br=80).

Ferrous oxide has a cubie structure and edge length of the uint cell is 5.0Å . Assuming the density o ferrous oxide to be 3.84 g//cm^(3) , the no. Of Fe^(2+) and O^(2-) ions present in each unit cell be : (use N_(A)= 6xx 10^(23) ):

The unit of an element of atomic mass 96 and density 10.3gcm^-3 is a cube with edge length of 314 pm. Find the structure of the crystal lattice (simple cubic, FCC or BCC) (Avagadro's constant, N_0=6.023xx10^23 mol^-1 ).

Calculate the Avogadro number from the following data of AB, when AB has NaCl type structure : Density of AB=2.48"g cm"^(-3),m=58"g mol"^(-1) Distance between A^(+)andB^(-) in AB = 2.69 pm.

Find the shortest distance and the vector equation of the line of shortest distance between the lines given by : vecr= (-4hati+4hatj+hatk)+lambda(hati+hatj-hatk) and vecr=(-3hati-8hatj-3hatk)+mu(2hati+3hatj+3hatk) .