Use of a nonlinear model to estimate milk losses due to subclinical mastitis in Holstein-Zebu cows

The objective of this observational study was to estimate milk loss from subclinical mastitis (SCM) using a nonlinear one-phase exponential decay function fitted to the relationship between the sum of the California mastitis test scores of productive quarters (x1, 0 to 16) and daily milk production per cow (y, kg/day). The function was y = (a – b)e⁻ᶜ¹*ˣ¹ + b, where a is the predicted y when x is zero, b is the y when x1 tends to infinity, and c1 is a rate constant. The fitted function was y = (10.02 – 5.76)e⁻⁰.⁰⁶¹³⁷*ˣ¹ + 5.76, with an adjusted coefficient of determination (R²ₐdⱼ) of 0.0692, a standard deviation of the residual (Sy.ₓ) equal to 13.49, and an Akaike’s information criterion corrected (AICC) of 3902.8. To this function, we added the multiplicative factors test day (x2, 1 to 12), the number of productive quarters (x3, 2, 3 or 4), months of age of cow (x4, 25 to 209), and days in milk (x5, 2 to 196), to adjust the decay function for their effects. The fitted model was y = [(9.65 – 3.95)e⁻⁰.⁰³⁴¹⁵*ˣ¹ + 3.95] (x2–⁰.¹⁰⁸¹) (x3⁰.¹⁰⁴⁹) (x4⁰.¹⁵⁸⁹) (x5–⁰.¹⁹⁷²) with R² of 0.3166, Sy.ₓ = 11.38, and AICC = 3821.9. We used the adjusted decay function parameters to compute a conversion factor (CF, 0 to 1) each x1 integer value from 0 to 16 to project its actual y to that of an SCM-free udder (x = 0). Then, the CF for a x1 of 0 equals to 9.65/9.65 = 1, and for a x1 of 8 equals 8.28, so its CF would be 8.29/9.65 = 0.8588. A cow with a 5.5 kg/day milk production at an x1 score of 8 would have an SCM-free production of 5.5/0.8588 = 6.4 kg/day, and its daily milk loss would be 6.4-5.5 = 0.9 kg/day. The difference, multiplied by MX$ 5.50 (US$ 0.275), would result in an economic loss of 4.95 Mexican pesos per day. This procedure makes possible the timely on-site estimation of economic losses due to subclinical mastitis.