Partitions: Difference between revisions

Latest revision as of 13:22, 2 March 2023

This section is currently under construction. Please check back later for updates and revisions.

The Whiten-Beta expression for partition to overflow is:^[1]

E_{\rm {oa}}({\bar {d}}_{i})=C\left[{\dfrac {\left(1+\beta \beta ^{*}{\dfrac {{\bar {d}}_{i}}{d_{\rm {50c}}}}\right)(\exp(\alpha )-1)}{\exp \left(\alpha \beta ^{*}{\dfrac {{\bar {d}}_{i}}{d_{\rm {50c}}}}\right)+\exp(\alpha )-2}}\right]

where:

$i$ is the index of the size interval, $i=\{1,2,\dots ,n\}$ , $n$ is the number of size intervals
$E_{\rm {oa}}({\bar {d}}_{i})$ is the fraction of particles of size interval $i$ in the feed reporting to the overflow stream (frac)
${\bar {d}}_{i}$ is the geometric mean size of particles in size interval $i$ (mm)
$d_{\rm {50c}}$ is the corrected size at which 50% of the particle mass reports to underflow and 50% to overflow (mm)
$C$ is the fraction of feed liquids (or fines) split to overflow (frac)
$\alpha$ is a parameter representing the sharpness of separation
$\beta$ is a term introduced to accommodate the so-called fish-hook effect, and controls the initial rise in the efficiency curve at finer sizes
$\beta ^{*}$ is computed to ensure the Whiten-Beta function preserves the definition of $d_{\rm {50c}}$ in the presence of the fish-hook, i.e. $E=0.5C$ at $d_{\rm {50c}}$

The value of $\beta ^{*}$ is not an input parameter and is computed numerically, by iteration, since by rearrangement:

\beta ^{*}={\dfrac {\ln {\big [}\exp(\alpha )+2\beta \beta ^{*}(\exp(\alpha )-1){\big ]}}{\alpha }}

When the value of $\beta$ is zero, the Whiten-Beta equation reverts to:

E_{{\rm {oa}}i}=C\left[{\dfrac {\exp(\alpha )-1}{\exp \left(\alpha {\dfrac {{\bar {d}}_{i}}{d_{\rm {50c}}}}\right)+\exp(\alpha )-2}}\right]

This section is currently under construction. Please check back later for updates and revisions.

This section is currently under construction. Please check back later for updates and revisions.

↑ Napier-Munn, T.J., Morrell, S., Morrison, R.D. and Kojovic, T., 1996. Mineral comminution circuits: their operation and optimisation. Julius Kruttschnitt Mineral Research Centre, Indooroopilly, QLD.

@@ Line 14: / Line 14: @@
 :<math>\beta^* = \dfrac{\ln \big[ \exp (\alpha) + 2 \beta \beta^* (\exp (\alpha) - 1) \big]}{\alpha}</math>
+When the value of <math>\beta</math> is zero, the Whiten-Beta equation reverts to:
+:<math>E_{{\rm oa}i} = C \left [ \dfrac{ \exp (\alpha) - 1}{\exp \left ( \alpha \dfrac{\bar d_i}{d_{\rm 50c}} \right ) + \exp (\alpha) - 2} \right ]</math>
 == Excel ==