Tumbling Mill (Power, Hogg and Fuerstenau): Difference between revisions

${\displaystyle Parameters={\begin{bmatrix}{\text{Mill type}}\\D{\text{ (m)}}\\L{\text{ (m)}}\\N_{\rm {c}}{\text{ (frac)}}\\J{\text{ (v/v)}}\\J_{\rm {b}}{\text{ (v/v)}}\\J_{\rm {p}}{\text{ (v/v)}}\\\alpha {\text{ (deg.)}}\\(1-\eta ){\text{ (kW/kW)}}\\f_{\rm {s}}{\text{ (w/w)}}\\\rho _{\rm {m}}{\text{ (t/m}}^{\text{3}}{\text{)}}\\\rho _{\rm {b}}{\text{ (t/m}}^{\text{3}}{\text{)}}\\f_{\rm {v}}{\text{ (v/v)}}\\\end{bmatrix}},\;\;\;\;\;\;mdMillPower\_HoggFuerstenau={\begin{bmatrix}P_{\rm {gross}}{\text{ (kw)}}\\P_{\rm {net}}{\text{ (kw)}}\\P_{\rm {b}}{\text{ (kw)}}\\P_{\rm {r}}{\text{ (kw)}}\\P_{\rm {s}}{\text{ (kw)}}\\P_{\rm {o}}{\text{ (kw)}}\\{\text{Charge volume (m}}^{\text{3}}{\text{)}}\\{\text{Ball mass (t)}}\\{\text{Rock mass (t)}}\\{\text{Interstital slurry mass (t)}}\\{\text{Above balls slurry mass (t)}}\\\rho _{\rm {p}}{\text{ (t/m}}^{\text{3}}{\text{)}}\\\rho _{\rm {ap}}{\text{ (t/m}}^{\text{3}}{\text{)}}\\\end{bmatrix}}\;\;\;\;\;\;\;\;\;\;\;\;}$

where:

• ${\displaystyle {\text{Mill type}}}$ is the type of mill, 0 = autogenous or semi-autogenous, 1 = ball
• ${\displaystyle {\text{Charge volume}}}$ is the volume of the charge (m³)
• ${\displaystyle {\text{Ball mass}}}$ is the mass of balls in the mill (t)
• ${\displaystyle {\text{Rock mass}}}$ is the mass of rocks in the mill (t)
• ${\displaystyle {\text{Interstitial slurry mass}}}$ is the mass of slurry in the interstitial charge void space (t)
• ${\displaystyle {\text{Above slurry mass}}}$ is the mass of excess slurry above the charge (t)