Tumbling Mill (Power, Morrell Continuum)

${\displaystyle Parameters={\begin{bmatrix}D{\text{ (m)}}\\L{\text{ (m)}}\\D_{\rm {t}}{\text{ (m)}}\\\alpha _{c}{\text{ (degrees)}}\\\phi {\text{ (frac)}}\\J_{\rm {t}}{\text{ (v/v)}}\\J_{\rm {B}}{\text{ (v/v)}}\\E{\text{ (v/v)}}\\U{\text{ (v/v)}}\\{\text{Discharge pulp density (}}\%{\text{ w/w)}}\\\rho _{\rm {o}}{\text{ (t/m}}^{\text{3}}{\text{)}}\\\rho _{\rm {L}}{\text{ (t/m}}^{\text{3}}{\text{)}}\\\rho _{\rm {B}}{\text{ (t/m}}^{\text{3}}{\text{)}}\\k{\text{ (kW/kW)}}\\{\text{Grate discharge}}\\\end{bmatrix}},\;\;\;\;\;\;mdMillPower\_MorrellC={\begin{bmatrix}{\text{No-load power (kW)}}\\{\text{Net power (kW)}}\\{\text{Gross power (kW)}}\\\theta _{\rm {S}}{\text{ (rad)}}\\\theta _{\rm {T}}{\text{ (rad)}}\\\theta _{\rm {TO}}{\text{ (rad)}}\\r_{\rm {i}}{\text{ (m)}}\\\end{bmatrix}}\;\;\;\;\;\;}$

where:

• ${\displaystyle D_{\rm {t}}}$ is the diameter of the discharge trunnion (m)
• ${\displaystyle {\text{Discharge pulp density}}}$ is the mass fraction of solids in the discharge pulp (% w/w)
• ${\displaystyle \rho _{\rm {L}}}$ is the density of liquids (t/m³)
• ${\displaystyle {\text{Discharge mechanism}}}$ is true if the mill is configured with a grate discharge, false if an overflow discharge
• ${\displaystyle {\text{Net power (kW) = Gross power (kW) - No-load power (kW)}}}$