Silver crystallises in fcc lattice. If edge length of the cell is `4.07xx10^(-8)` and density is 10.5 g `cm^(-3)`. Calculate the atomic mass of silver.

Silver crystallises in fcc unit cell. The edge length of unit cell is 409 pm. Find the radius of silver atom.

Silver crsytallises in fcc 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 408.6 pm. The density of silver is 10.5 g cm^(-3) . Calculate the atomic mass of silver.

An element occurs in b c c structure with cell edge of 288 p m .Its density is 7.2 g cm^-3 . calculate the atomic mass of the element.

Silver is a very precious metal and is used in jewellery. One million atoms of silver weight 1.79 xx 10^(-16) g . calculate the atomic mass of silver.

Silver is a very precious metal and is used in jewellery. One million atoms of silver weight 1.79 xx 10^(-16)g . calculate the atomic mass of silver.

An element occurs in bcc structure. It has a cell edge length of 250 pm. Calculate the molar mass if its density is 8.0 g cm^(-3) . Also calculate the radius of an atom of this element.

Copper crystallises into a fcc lattice with edge length 3.61xx10^(-8) cm. Show that the calculated density of Cu is in agreement with its measured value of 8.92 g cm^(-3) .

An element with density 11.2 g cm^(-3) forms a fcc lattice with edge length of 4 xx 10^(-8) cm. Calculate the atomic mass of the element. (Given, N_(A)=6.022 xx 10^(23)"mol"^(-1) )

Niobium crystallises in a body-centred cubic structure. If its density is 8.55 g cm^(-3) , calculate the atomic radius of niobium using its atomic mass 93 u.