Lithium metal has a body centred cubic lattice structure with edge length of unit cell 352 pm. Calculate the density of lithium metal (Given : Atomic mass of Li = 7 g mol^(-1) )
In face -centered cubic unit cell, edge length is
A face-centred cubic element (atomic mass 60 ) has a cell edge of 400 pm. What is its density?
Nickle crystallise in a fcc unit cell with a cell edge length of 0.3524 nm. Calculate the radius of the nicke atom
Platinum crystallize in a face centered cube crystal with a unit cell length of 3.9231 Å . The density and atomic radius of platinum are respectively: [Atomic mass of Pt = 195]
A metal crystallizes in a face centred cubic unit cell with a = 0.560 nm . Calculate the density of the metal if it contains 0.1% Schottky defects. (Atomic mass of metal = 40 g mol^(-1))
Platinum crystallises in a face centered cube crystal with a unit cell length of 3,9231 Å . The density and atomic radius of platinum are respectively. [Atomic mass of Pt = 195]
An elemetnts crystallizes in a face centered cubic lattice and the edge of the unit cell is 0.559nm. The density is 3.19g//cm^(3) . What is the atomic mass?
A unit cell of NaCl has 4 formula units. Its edge length is 0.50 nm. Calculate the density if molar mass of NaCl = 58.5 g/mol.
