Difference between revisions of "Lattice:Packing fraction"
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Where ''N'' is the number of particles per unit cell (which has volume <math>v_{\mathrm{cell}}</math>). For a sphere, the volume is <math>V=4\pi R^3/3</math> so: | Where ''N'' is the number of particles per unit cell (which has volume <math>v_{\mathrm{cell}}</math>). For a sphere, the volume is <math>V=4\pi R^3/3</math> so: | ||
:<math>\phi = \frac{ N 4 \pi R^3 } { 3 v_{\mathrm{cell}} }</math> | :<math>\phi = \frac{ N 4 \pi R^3 } { 3 v_{\mathrm{cell}} }</math> | ||
− | For a [[ | + | For a cubic [[unit cell]] of edge-length ''a'': |
:<math>\phi = \frac{ N 4 \pi R^3 } { 3 a^3 }</math> | :<math>\phi = \frac{ N 4 \pi R^3 } { 3 a^3 }</math> | ||
===Examples=== | ===Examples=== | ||
+ | For a [[Lattice:SC#Symmetry|SC lattice]], the packing fraction is 0.524: | ||
+ | * Nearest-neighbor distance: <math>d_{nn}=a</math> | ||
+ | * Assuming spherical particles of radius ''R'': | ||
+ | ** Particle volume fraction: <math>\phi=4 \pi R^3/\left(3a^3\right)</math> | ||
+ | ** Maximum volume fraction: <math>\phi_{max}=4\pi/24\approx0.5236</math> when <math>R=a/2</math> | ||
For a [[Lattice:FCC#Symmetry|FCC lattice]], the packing fraction is 0.740: | For a [[Lattice:FCC#Symmetry|FCC lattice]], the packing fraction is 0.740: | ||
* Nearest-neighbor distance: <math>d_{nn}=\sqrt{2}a/2</math> | * Nearest-neighbor distance: <math>d_{nn}=\sqrt{2}a/2</math> | ||
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* Nearest-neighbor distance: <math>d_{nn}=\sqrt{3}a/4 \approx 0.433 a</math> | * Nearest-neighbor distance: <math>d_{nn}=\sqrt{3}a/4 \approx 0.433 a</math> | ||
* Assuming spherical particles of radius ''R'': | * Assuming spherical particles of radius ''R'': | ||
− | ** Particle | + | ** Particle volume fraction: <math>\phi=32 \pi R^3/\left(3a^3\right)</math> |
** Maximum volume fraction: <math>\phi_{max}=\pi\sqrt{3}/16\approx0.340</math> when <math>R=a\sqrt{3}/8</math> | ** Maximum volume fraction: <math>\phi_{max}=\pi\sqrt{3}/16\approx0.340</math> when <math>R=a\sqrt{3}/8</math> |
Latest revision as of 18:23, 11 February 2015
The packing fraction (or particle volume fraction) for a lattice is given by:
Where N is the number of particles per unit cell (which has volume ). For a sphere, the volume is so:
For a cubic unit cell of edge-length a:
Examples
For a SC lattice, the packing fraction is 0.524:
- Nearest-neighbor distance:
- Assuming spherical particles of radius R:
- Particle volume fraction:
- Maximum volume fraction: when
For a FCC lattice, the packing fraction is 0.740:
- Nearest-neighbor distance:
- Assuming spherical particles of radius R:
- Particle volume fraction:
- Maximum volume fraction: when
For a BCC lattice, the packing fraction is 0.680:
- Nearest-neighbor distance:
- Assuming spherical particles of radius R:
- Particle volume fraction:
- Maximum volume fraction: when
For a diamond lattice, the packing fraction is 0.340:
- Nearest-neighbor distance:
- Assuming spherical particles of radius R:
- Particle volume fraction:
- Maximum volume fraction: when