Difference between revisions of "Austin SAG model"
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* Motor rated speed, in units of mill RPM (not motor RPM, must multiply by gear ratios). |
* Motor rated speed, in units of mill RPM (not motor RPM, must multiply by gear ratios). |
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* Quantity of pinions (and motors) |
* Quantity of pinions (and motors) |
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| + | ==Model output== |
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| + | The Austin model outputs the mechanical power of the cylindrical section of a tumbling mill. The software adds an extra 5% for cone ends for situations where the mill has a cone angle greater than 1%. The default mill cone angle is 15%, so entering an angle of 0° will trigger the default of 15% (so use a fake cone angle of 0.5° for flat-ended mills). |
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| + | ==Model calibration== |
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| + | Alex Doll did a model calibration check of several SAG mill power draw models (including the Austin model) in Procemin 2013 and IMPC 2016. The model deviation from measurements has a standard deviation of 9% and average/median of 1.1%/1.5% (meaning there is a minor bias high). |
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| + | These works are available from: |
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| + | <li>[https://www.sagmilling.com/articles/20/view/Procemin2013-AlexDoll-SAGPowerModels.pdf?s=1 Technical paper for Procemin 2013] |
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| + | <li>[https://www.sagmilling.com/articles/29/view/IMPC2016-AlexDoll-SAG%20data%20set.pdf?s=1 Technical paper for IMPC 2016] (supersedes the Procemin 2013 paper) |
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| + | <li>[https://www.sagmilling.com/articles/25/view/SurveyTabulation-IMPC2016-v6.ods?s=1 Data set for IMPC 2016] |
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Latest revision as of 15:44, 15 September 2025
Contents
History
The SAG mill model by proposed by Leonard Austin (1990) was largely based on modifications of earlier tumbling mill models by Hogg & Fuerstenau and F. Bond. The model uses a kinetic-potential energy balance to describe the power draw of a mill charge. Many geometric components of the earlier models were fit to empirical relationships measured by Austin.
Model Form
The power draw model for a SAG mill cylinder of the following form:
![P = K D^{2.5} L ( 1 - AJ_{total}) \left [ (1-\epsilon_{B}) \left( \frac{\rho_{solids}}{w_{C}} \right ) J_{total} + 0.6 J_{balls} \left( \rho_{balls} - \frac{\rho_{solids}}{w_C} \right) \right ] \phi_{C} \left( 1 - \frac{0.1}{2^{9-10\phi_C}} \right)](/images/math/5/1/2/5122ae16b1e0f4a4bf3eaa0815716fd8.png)
Where:
- P is the power evolved at the mill shell, kW
- K and A are empirical fitting factors (use 10.6 and 1.03, respectively)
- D is the mill effective diameter (inside the effective liner thickness), m
- L is the mill effective grinding length (also referred to as the 'belly length), m
- Jtotal is the mill total volumetric filling as a fraction (eg. 0.30 for 30%)
- εB is the porosity of the rock and ball load (use 0.3)
- wC is the charge %solids, fraction by weight (use 0.80 Doll, 2013)
- Jballs is the mill volumetric filling of balls as a fraction (eg. 0.10 for 10%)
- ρX is the density of component X, t/m3
- φC is the mill speed as a fraction of critical (eg. 0.75 for 75% of critical)
Mill cone angles
The model supports flat-ended mills (cone angle of 0°) or a cone angle of 15°. Any other value entered for the cone angle will be treated as 15°.
To account for cone ends of mills, an allowance of 5% is used Doll, 2013 instead of the formula proposed by Austin.
Percent solids
The model is run with a fixed 80% solids by weight Doll, 2013. This is because the form of the equation proposed by Austin appears to have the %solids term in the wrong place (denominator of the expression rather than the numerator where other models put it). The calibration presented at IMPC 2016 suggests the fixed %solids term is reasonably valid over the range of 60% to 80% solids.
Model Inputs
the Austin model requests the following mill data:
- mill nominal diameter inside shell
- mill effective grinding length
- ball load as vol percentage (eg. 10)
- ball density
- total charge load as vol percentage (eg. 30)
- pulp percent solids
- mill speed
- liner effective thickness
- cone end angle (only values 0-5 or >5 matter, minor angle changes have no effect)
Motor characteristics are also requested:
- Motor rated power (output shaft)
- Mechanical efficiency of downstream drive (pinions, gearboxes)
- Motor efficiency and any other efficiency factors to the DCS measurement position in the network.
- Motor rated speed, in units of mill RPM (not motor RPM, must multiply by gear ratios).
- Quantity of pinions (and motors)
Model output
The Austin model outputs the mechanical power of the cylindrical section of a tumbling mill. The software adds an extra 5% for cone ends for situations where the mill has a cone angle greater than 1%. The default mill cone angle is 15%, so entering an angle of 0° will trigger the default of 15% (so use a fake cone angle of 0.5° for flat-ended mills).
Model calibration
Alex Doll did a model calibration check of several SAG mill power draw models (including the Austin model) in Procemin 2013 and IMPC 2016. The model deviation from measurements has a standard deviation of 9% and average/median of 1.1%/1.5% (meaning there is a minor bias high).
These works are available from:
