Advertisements
Advertisements
प्रश्न
An element has bcc structure with a cell edge of 288 pm. The density of the element is 7.2 g cm−3. How many atoms are present in 208 g of the element?
Advertisements
उत्तर
The bcc structure, n = 2
`ρ = (n xx M)/(a^3 xx N_A)`
`7.2 g cm^-3 = (2 xx M)/((288 xx 10^-10 cm)^3 xx (6.023 xx 10^23 mol^-1))`
`7.2 g cm^-3 = (2 xx M)/((23887872 xx 10^-30 cm^3) xx (6.023 xx 10^23 mol^-1))`
`7.2 g cm^-3 = (2 xx M)/((2.38 xx 10^-23 cm^3) xx (6.023 xx 10^23 mol^-1))`
`7.2 g cm^-3 = (2 xx M)/(14.33 cm^3 mol^-1)`
`((7.2 g cm^-3) xx (14.33 cm^3 mol^-1))/2 = M`
M = `(103.176 g mol^-1)/2`
M = 51.58 g mol−1
By mole concept, 51.58 g of the element contains 6.023 × 1023 atom 208 g of the element will contain
= `(6.023 xx 10^23 xx 208)/51.58` atoms
= `(1252.784 xx 10^23 )/51.58` atoms
= 24.2 × 1023 atoms ≈ 2.42 × 1024 atoms
संबंधित प्रश्न
The number of unit cells in 8 gm of an element X (atomic mass 40) which crystallizes in bcc pattern is (NA is the Avogadro number)
The vacant space in bcc lattice unit cell is ____________.
The fraction of total volume occupied by the atoms in a simple cubic is
Potassium has a bcc structure with nearest neighbor distance 4.52 A0. its atomic weight is 39. its density will be
Explain briefly seven types of unit cells.
Calculate the number of atoms in a fcc unit cell.
What is meant by the term “coordination number”?
What is the coordination number of atoms in a bcc structure?
KF crystallizes in fcc structure like sodium chloride. calculate the distance between K+ and F− in KF.
(Given: density of KF is 2.48 g cm−3)
Sodium metal crystallizes in bcc structure with the edge length of the unit cell 4.3 × 10−8 cm. calculate the radius of a sodium atom.
