Silver crystallises in fcc lattice. If edge length of the cell is 4.07xx`10^(-8)`
cm and density is `10.g cm^(-3)`, calculate the atomic mass of silver.

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

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

.A metal crystallises in fcc lattice.If edge length of the cell is 4.07×10^−8 cm and density is 10.5gcm^−3 . Calculate the atomic mass of metal.

Silver crystallises in a fcc lattice. The edge length of its unit is 4.077xx10^(-8)cm and its density is 10.5g cm^(-3) . Claculate on this basis of the atomic mass of silver (N_(A)=6.02xx10^(23) "mol"^(-1))

Silver crystalilises in a fcc lattice. The edge length of its unit is 4.077xx10^(-8)xxcm and its density is 10.5g cm^(-3) . Claculate on this basis the atomic mass of silver (N_(A)=6.02xx10^(23) "mol"^(-1))

Silver crystallises in fcc latice. If edge length of the unit cell is 4.077xx10^(-8)cm , then calculate the radius of silver atom.

A element crystallises in a bcc structure. The edge length of its unit cell is 288 pm. If the density of the crystal is 7.3 g cm^(-3) , what is the atomic mass of the element ?

Silver crystallises in a face centred cubic lattice with all the atoms at the lattice points. The length of the edge of the unit cell as determined by X-ray diffraction studies is found to be 4.077xx10^(-8) cm. The density of silver is 10.5"g cm"^(-3) . Calculate the atomic mass of silver.

Silver metal crystallises with a face centred cubic lattice. The length of the unit cell is found to be 3.0xx10^(-8) cm. Calculate atomic radius and density of silver. Molar mass of Ag =108 g mol^(-1), N_(A)=6.02xx10^(23)mol^(-1) ).

Silver metal crystallizes with a face centred cubic lattice. The length of the unit cell is found to be 4.077 xx 10^(-8) cm. Calculate atomic radius and density of silver. (Atomic mass of Ag = 108 u, N_A = 6.02 xx 10^(23) mol^(-1) )