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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
  • Formulas
  • 1) HHg ((BPN)-DHUa)OCC
  • 2) POPg HHg PHH
  • 3) POPf POPc POPg
  • Where HHg Growth In Number of Households
  • BP Average Number of Bldg. Permits issued per
    year since most recent census
  • N Forecast period in Years
  • HUa No. of Housing Units in Annexed Area
  • OCC Occupancy Rate
  • POPg Population Growth
  • PHH Persons per Household
  • POPc Population at last census
  • POPf Population Forecast

32
Housing Unit Method Example
  • Forecast Growth in Number of Housing Units
  • 1) HHg ((BPN)-DHUa)OCC
  • HHg ((1935)-00)95.1
  • HHg 918
  • Forecast Growth in Population
  • 2) POPg HHg PHH
  • POPg 918 2.74
  • POPg 2,515
  • Forecast Total Population
  • 3) POPf POPc POPg
  • POPf 126,003 2,515
  • POPf 128,518

33
So Thats Population Forecasting
Are there any Questions?
Wayne Foss, MBA, MAI, Fullerton, CA USA Email
waynefoss_at_usa.net
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