Chapter 18 - forecasting Flashcards
what is a time series
a series of figures or values recorded over time
two components of a time series
- TREND = underlying long term movement
- SEASONAL VARIATIONS = short term fluctuations in recorded values due to different circumstances
other components of a time series
- CYCLICAL VARIATIONS = trade cycle related, booms/slumps
- RESIDUAL VARIATIONS = caused by something other than trend/seasonal/cyclical
methods of finding the trend
- line of best fit
- linear regression analysis
- moving averages
how can moving averages be used to find the trend
a moving average is an average of the results of a fixed number of periods
it is common for a moving average to be measured over an even number of time periods
by analysing averages, seasonal variations can be smoothed out
normal average vs moving average
average = mid point of the period
moving average = relates to particular time period in time series
what is the additive model
method of calculating season variation
assumes that:
time series = trend + seasonal variation
how to calculate seasonal variation using additive model
- identify the trend
- deduct the trend from the time series data to obtain the seasonal variation
(rearranging time series = trend + seasonal variation into seasonal variation = time series - trend) - calculate average seasonal variation for each quarter
difference between additive and multiplicative model
- additive model assumes seasonal variation doesn’t increase over time but this is unlikely
- the multiplicative model is more suitable than the additive model for forecasting when the trend is increasing or decreasing over time
- additive model simply adds absolute and unchanging seasonal variations to the trend figures whereas multiplicative multiplies or decreases trend values by a seasonal variation factor
how can we use trend and seasonal variation for forecasting
- identify trend using moving averages, and calculate the average trend growth per period
- extrapolate trend figures to cover forecast period using expected average trend growth
- adjust forecast trends by the applicable average seasonal variation to obtain the actual forecast
what is regression analysis
an alternative to line of best fit
LINEAR regression finds the line of best fit using mathematical formulae to identify line closest to data points on the diagram
y = a +bx
a = intercept
x = independent variable
types of correlation
positive = high values of one variable relate to high values of another
negative = high values of one variable relate to low values of another
correlation co-efficient values meaning
r = + 1 = perfectly positively correlated
r = - 1 = perfectly negatively correlated
r = 0 = uncorrelated
what is the coefficient of determination
the coefficient of determination r2 measures the proportion of the total variation in the value of one variable that can be explained by variations in the value of the other variable
what is spearmans rank correlation coefficient
sometimes variables are in rank order rather than actual values so spearmans rank can be used
same values as correlation coefficient
