1
answer
0
watching
271
views
10 Nov 2019
Equation for determining the radius of a simple cubic unit cell is r = l/2 Equation for determining the radius of a face-centered cubic unit cell is r = l squareroot 2/4 Equation for determining the radius of a body-centered cubic unit cell is r = l squareroot 3/4 Ga has a density equal to 5.904 g/cm^3 and the radius of a gallium atom is 136 pm. The type of cubic lattice structure for gallium is (The atomic mass of gallium is 69.723 amu) Simple cubic lattice structure Body-centered cubic lattice structure Face-centered cubic lattice structure Not possible to ascertain None of the above
Equation for determining the radius of a simple cubic unit cell is r = l/2 Equation for determining the radius of a face-centered cubic unit cell is r = l squareroot 2/4 Equation for determining the radius of a body-centered cubic unit cell is r = l squareroot 3/4 Ga has a density equal to 5.904 g/cm^3 and the radius of a gallium atom is 136 pm. The type of cubic lattice structure for gallium is (The atomic mass of gallium is 69.723 amu) Simple cubic lattice structure Body-centered cubic lattice structure Face-centered cubic lattice structure Not possible to ascertain None of the above
Deanna HettingerLv2
28 Mar 2019