ì = 50, è = 0.5, å₉₉ = 6, y₁₀₀ = 57, and ó²_å = 16.

ì – è × å_t-1, so the estimate for period 100 = 50 – 0.5 × 6 = 47.

ì + å_t – è × å_t-1. ì and è are parameters, not random variables. In period T+1, the value of å_t is known, so its variance is zero.

ì + å_T+1 – è × å_T) = 0 + ó²_t + è² × 0 = ó²_t = 16.

ì = 50.

å_t+1 and å_t+2 are both unknown, so their variances are ó²_t. The residuals in different periods are independent, so the variance of the sum of the sum of the variances. The variance of the two periods ahead forecast = variance (ì + å_T+2 – è × å_T+1) = 0 + ó²_t + è² × ó²_t = (1 + è²) × ó²_å = (1 + 0.5²) × 16 = 20.

ì = å_t – 0.5 å_t-1 , with ì = 50, å_T-1 = 6, y_T = 57, and ó²_t = 16.

ì – è × å_t-1, so the fitted value for period T is _T = 50 – 0.5 × 6 = 47.

ì + å_t – è × å_t-1.

and è are parameters, not random variables. In period T+1, the value of å_t is known, so its variance is zero.

ì + å_T+1 – è × å_T) = 0 + ó²_t + è² × 0 = ó²_t = 16.

ó²_t. We estimate its value from the observed values and we use t-values instead of z-values for the 95% confidence interval. The regression analysis course deals with t-values and confidence intervals; the time series course gives you the figures (usually a z-value).

ì = 50.

å_t+1 and å_t+2 are both unknown, so their variances are ó²_t. The residuals in different periods are independent, so the variance of the sum of the sum of the variances. The variance of the two periods ahead forecast = variance (ì + å_T+2 – è × å_T+1) = 0 + ó²_t + è² × ó²_t = (1 + è²) × ó²_å = (1 + 0.5²) × 16 = 20.