Each edge of a cubic unit cell is 400pm long. If atomic mass of the elements is 120 and its desity is `6.25g//cm^(2)`, the crystal lattice is: `(use N_(A)=6 xx 10^(23))`

An element has a body centered cubic structure with a unit cell edge length of 400 pm. Atomic mass of an element is 24 gmol^(-1) What is the density of the element? (N_A = 6 times 10^23 mol^-1)

The cubic unit cell of a metal (molar mass = 63.55g mol^(-1) ) has an edge length of 362 pm. Its density is 8.92 g cm^(-3) . The type of unit cell is

The Cubic Unit cell of a metal (molar mass = 63.55 g mol^(-1)) has an edge length of 362 pm. Its density is 8.92 g.cm^(-3) . The type of unit cell is

The edge length of unit cell of metal having molecular weight 75g//mol is 5Å which crystallises in simple cubic lattice. If the density is 2g/cc then the radius of metal atom in pm is x xx 10^(2) then 'x' is (N_(A) = 6 xx 10^(23))

Silver crystallizes in FCC lattice . If edge of the cell is 4.07 xx 10^(-8) and density is 10.5 g. cm^(3) . Calculate the atomic mass of silver .

If an element (at. wt. = 50) crystal in foc lattice, with a = 0.50 nm. What is the density of unit cel if it contains 0.25 % . Schottky defects (use N_(A) = 6 xx 10^(23) ) ?

Ferrous oxide has a cubic structure and eged length of the unit cell is 5.0 A. Assuming the density of ferrous oxide to be 3.84g//cm^(3) the no. of Fe^(2+) and O^(-2) ions present in each unit cell are ("use "N_(A) = 6 xx 10^(23))

A metal has fcc lattice. The edge length of the unit cell is 404 pm. The density of the metal is 2.72 g cm^(-3) . The molar mass of the metal is

For a cubic lattice edge length of unit cell is 5A^(0) and density is 2g c c^(-1) . Calculate the radius of an atom, if gram atomic weight is 75 gmol^(-1)

For a cubic lattice edge length of unit cell is 5A^(0) and density is 2gcc^(-1) . Calculate the radius of an atom, if gram atomic weight is 75 g mol^(-1) .