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Population Forecasting

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Title: Population Forecasting

1
Population Forecasting

Time Series Forecasting Techniques

Wayne Foss, MBA, MAI Wayne Foss Appraisals,
Inc. Email wfoss_at_fossconsult.com
2
Extrapolation Techniques

Real Estate Analysts - faced with a difficult
task
long-term projections for small areas such as
Counties
Cities and/or
Neighborhoods
Reliable short-term projections for small areas
Reliable long-term projections for regions
countries
Forecasting task complicated by
Reliable, Timely and Consistent information

3
Sources of Forecasts

Public and Private Sector Forecasts
Public California Department of Finance
Private CACI
Forecasts may be based on large quantities of
current and historical data

4
Projections are Important

Comprehensive plans for the future
Community General Plans for
Residential Land Uses
Commercial Land Uses
Related Land Uses
Transportation Systems
Sewage Systems
Schools

5
Definitions

Estimate
is an indirect measure of a present or past
condition that can be directly measured.
Projection (or Prediction)
are calculations of future conditions that would
exist as a result of adopting a set of underlying
assumptions.
Forecast
is a judgmental statement of what the analyst
believes to be the most likely future.

6
Projections vs. Forecasts

The distinction between projections and forecasts
are important because
Analysts often use projections when they should
be using forecasts.
Projections are mislabeled as forecasts
Analysts prepare projections that they know will
be accepted as forecasts without evaluating the
assumptions implicit in their analytic results.

7
Procedure

Using Aggregate data from the past to project the
future.
Data Aggregated in two ways
total populations or employment without
identifying the subcomponents of local
populations or the economy
I.e. age or occupational makeup
deals only with aggregate trends from the past
without attempting to account for the underlying
demographic and economic processes that caused
the trends.
Less appealing than the cohort-component
techniques or economic analysis techniques that
consider the underlying components of change.

8
Why Use Aggregate Data?

Easier to obtain and analyze
Conserves time and costs
Disaggregated population or employment data often
is unavailable for small areas

9
Extrapolation A Two Stage Process

Curve Fitting -
Analyzes past data to identify overall trends of
growth or decline
Curve Extrapolation -
Extends the identified trend to project the future

10
Assumptions and Conventions

Graphic conventions Assume
Independent variable x axis
Dependent variable y axis
This suggests that population change (y axis) is
dependent on (caused by) the passage of time!
Is this true or false?

11
Assumptions and Conventions

Population change reflects the change in
aggregate of three factors
births
deaths
migration
These factors are time related and are caused by
other time related factors
health levels
economic conditions
Time is a proxy that reflects the net effect of a
large number of unmeasured events.

12
Caveats

The extrapolation technique should never be used
to blindly assume that past trends of growth or
decline will continue into the future.
Past trends observed, not because they will
always continue, but because they generally
provide the best available information about the
future.
Must carefully analyze
Determine whether past trends can be expected to
continue, or
If continuation seems unlikely, alternatives must
be considered

13
Alternative Extrapolation Curves

Linear
Geometric
Parabolic
Modified Exponential
Gompertz
Logistic

14
Linear Curve

Formula Yc a bx
a constant or intercept
b slope
Substituting values of x yields Yc
Conventions of the formula
curve increases without limit if the b value gt 0
curve is flat if the b value 0
curve decreases without limit if the b value lt 0

15
Linear Curve
16
Geometric Curve

Formula Yc abx
a constant (intercept)
b 1 plus growth rate (slope)
Difference between linear and geometric curves
Linear constant incremental growth
Geometric constant growth rate
Conventions of the formula
if b value gt 1 curve increases without limit
b value 1, then the curve is equal to a
if b value lt 1 curve approaches 0 as x increases

17
Geometric Curve
18
Parabolic Curve

Formula Yc a bx cx2
a constant (intercept)
b equal to the slope
c when positive curve is concave upward
when 0, curve is linear
when negative, curve is concave downward
growth increments increase or decrease as the
x variable increases
Caution should be exercised when using for long
range projections.
Assumes growth or decline has no limits

19
Parabolic Curve
20
Modified Exponential Curve

Formula Yc c abx
c Upper limit
b ratio of successive growth
a constant
This curve recognizes that growth will approach a
limit
Most municipal areas have defined areas
i.e. boundaries of cities or counties

21
Modified Exponential Curve
22
Gompertz Curve

Formula Log Yc log c log a(bx)
c Upper limit
b ratio of successive growth
a constant
Very similar to the Modified Exponential Curve
Curve describes
initially quite slow growth
increases for a period, then
growth tapers off
very similar to neighborhood and/or city growth
patterns over the long term

23
Gompertz Curve
24
Logistic Curve

Formula Yc 1 / Yc-1 where Yc-1 c abX
c Upper limit
b ratio of successive growth
a constant
Identical to the Modified Exponential and
Gompertz curves, except
observed values of the modified exponential curve
and the logarithms of observed values of the
Gompertz curve are replaced by the reciprocals of
the observed values.
Result the ratio of successive growth
increments of the reciprocals of the Yc values
are equal to a constant
Appeal Same as the Gompertz Curve

25
Logistic Curve
26
Selecting Appropriate Extrapolation Projections

First Plot the Data
What does the trend look like?
Does it take the shape of any of the six curves
Curve Assumptions
Linear if growth increments - or the first
differences for the observation data are
approximately equal -
Geometric growth increments are equal to a
constant

27
Selecting Appropriate Extrapolation Projections,
cont

Curve Assumptions
Parabolic Characterized by constant 2nd
differences (differences between the first
difference and the dependent variable) if the 2nd
differences are approximately equal
Modified Exponential characterized by first
differences that decline or increase by a
constant percentage ratios of successive first
differences are approximately equal

28
Selecting Appropriate Extrapolation Projections,
cont

Curve Assumptions
Gompertz Characterized by first differences in
the logarithms of the dependent variable that
decline by a constant percentage
Logistic characterized by first differences in
the reciprocals of the observation value that
decline by a constant percentage
Observation data rarely correspond to any
assumption underlying the extrapolation curves

29
Selecting Appropriate Extrapolation Projections,
cont

Test Results using measures of dispersion
CRV (Coefficient of relative variation)
ME (Mean Error)
MAPE (Mean Absolute Percentage Error)
In General Curve with the lowest CRV,ME and
MAPE should be considered the best fit for the
observation data
Judgement is required
Select the Curve that produces results consistent
with the most likely future

30
Selecting Appropriate Extrapolation Projections,
cont
31
Housing Unit Method