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Improving Marketing Productivity: Introducing the HAMRAT process
Tim Ambler & Bruce Hardie
Centre for Marketing Working Paper No. 02-901 May 2002
Tim Ambler is a Senior Fellow at London Business School
Bruce Hardie is a Professor of Marketing of London Business School www.brucehardie.com
London Business School, Regent's Park, London NW1 4SA, U.K. Tel: +44 (0)20 7262-5050 Fax: +44 (0)20 7724-1145
http://www.london.edu/Marketing
Copyright ♥ London Business School 2002
1 The authors are most grateful to Olga Mironenko for her assistance with this paper.
Abstract
In a multi-brand organisation, the brands traditionally compete for resources in somedegree of isolation, whether budgets are built top down or bottom up. This paperaddresses a possibly growing demand for tools to allocate resources optimally acrossbrands and/or markets. After reviewing the theory and some of the models availableto UK practitioners, we develop a decision calculus model, called HAMRAT, thatcan be implemented within an Excel spreadsheet. The components of HAMRAThave been available in the public domain for many years but the fact that they arerarely used implies a need for their packaging into a convenient format that canbe developed by practitioners or used to benchmark models offered by agencies orconsultants.
“The causes and effects [of advertising] have been analyzed until theyare well understood. The correct methods of procedure have been provedand established. We know what is most effective, and we act on basiclaws.”—Claude Hopkins (1922)
1 Introduction
Traditionally marketing or brand plans have been built-up on a unitary basis, i.e.,
by brand or marketing unit. Total expenditures for large firms are then accumu-
lated bottom-up, albeit within strategic guidelines for each unit, e.g., whether they
are in investment or milking stages. Thus while brands have always competed for
resources, each brand and each item of the mix (advertising, promotions, etc.) has
had to justify its own expenditure independently. When the firm aggregates the
brand budgets, it may decide that the total marketing budget is too high (or, more
unusually, too low) and then re-allocate the initial proposals top down. Some firms
work the other way round, i.e., top down first, but in either case the final budgets
emerge from this cycle.
We are now seeing a greater interest in directly optimising the total expenditure
across brands and mix in order to maximise the return from the portfolio as a whole.
Multi-brand firms and their agencies are looking for new tools to provide this facility.
This also reflects an increasing pressure to maximise profits, or shareholder value,
rather than sales or market share.
While the mathematics required for this problem are not new, their practical
application is rare. Reasons include perceived complexity and heavy demands for
data. Agencies and consultants that offer solutions are also concerned, understand-
ably, to protect their competitive advantage. This article seeks to lift the veil. We
review theory and practice and propose a simple model, which we call HAMRAT,
that can be implemented in a simple Excel spreadsheet. We cannot fully establish
the extent to which it differs from existing proprietary models for reasons of their
confidentiality. On the other hand, by presenting this model as an open platform,
1
firms can use it to develop their own solutions or benchmark those suggested by
agencies and consultants.
This paper is structured as follows. First we dispel the myth that elasticities
(e.g., incremental sales from a unit of advertising) can be used to prioritise expendi-
ture, and argue that such prioritizations should instead be based on sales response
functions. We then review existing methodologies both in general and those specifi-
cally offered by some UK agencies. With that as background, we present HAMRAT
and then explore a worked example. We conclude with a discussion of limitations
and outline directions for future work.
2 The Limits of Elasticities
Demand elasticities of each element of the marketing mix, defined as the ratio of
the percentage change in demand to a given percentage change in marketing effort,
provide a useful summary of market responsiveness. As such, we often see price and
advertising elasticities reported whenever an econometric study of product sales is
undertaken. Furthermore, there is a widespread belief that the possession of these
elasticities enables us to determine the optimal marketing mix.
Dorfman and Steiner (1954) identified the conditions for the profit-maximising
mix of price, advertising expenditures, distribution effort, and product quality as
a function of the respective demand elasticities. Rao and Steckel (1995) reported
the conditions for the profit-maximising price and level of spend on one other ele-
ment of the marketing mix for a multi-product/market situation. Such analytical
results help us understand whether our current marketing mix efforts are optimal.
Unfortunately these analytical results are often mis-used in the following manner:
elasticities estimates from prior market studies are substituted in the derived “rules”
and solved for the “optimal” values of the marketing mix. Such an exercise is flawed
for several reasons.
2
The first is that it assumes that the elasticity is a single fixed number. This
is rarely the case as the value of the elasticity depends on the magnitude of the
marketing effort. For an S-shaped sales response curve, such as in Figure 1a, elas-
ticity is initially zero and returns to zero at high levels of spend. In between, it
increases and then decreases. For a concave sales response curve, such as in Fig-
ure 1b, elasticity is very high (technically infinity) at zero effort and decreases to zero
at high levels of spend. (It is interesting to note that the only sales response function
for which the elasticity is constant for all levels of marketing effort is the so-called
constant-elasticity model, sometimes referred to as the log-log model, e.g., sales =
β0(advertising)β1 or log(sales) = log(β0) + β1×log(advertising). It has been docu-
mented (e.g., Wisniewski and Blatberg 1988) that other functional forms, which do
not have the constant-elasticity property, generally provide a better fit to any given
dataset.) Therefore, while the estimated elasticities summarise the sales respon-
siveness for our current allocation of marketing effort, they do not reflect what the
marginal sales response would be at the optimal marketing mix allocation. Thus the
“optimal” values of the marketing mix derived from the elasticity estimates on-hand
are not the true profit maximising values.
——————————————[ Figure 1 about here ]
——————————————
Secondly, elasticities ignore brand equity. For most advertising and PR, the
impact of the communication on the consumer is separated by a significant time
interval from the moment at which the buying decision is made. Communications
do not directly affect sales; they affect brand equity that later affects sales. In other
words, if advertising is to have any effect it must change what we have in mind before
it can effect what we do. Thus communication effects should be judged by changes
in brand equity. Conversely, some other activities, e.g., price promotion, may cause
an immediate increase of sales but a decrease in brand equity. From an accounting
perspective, brand equity is the marketing asset which allows these brought forward
3
and carried forward effects to be factored into budgetary decisions. Perhaps with
this in mind, Broadbent (1979) coined the term “adstock” which represents the
audience’s retained awareness of current and past levels of advertising.
Thirdly, elasticities ignore the interactions among the various elements of the
marketing mix. Perhaps the most obvious interaction is that between advertising
and price. Advertising can either increase or decrease price sensitivity (Kaul and
Wittink 1995). In the latter case, this makes advertising more attractive from an
accounting perspective: price effects fall almost entirely to the bottom line whereas
increased volume sales attract increased costs, not necessarily in proportion.
Fourthly, sales are dependent on the competitive environment and especially on
whether other brands are increasing or reducing their expenditure. While these
competitive effects can be captured via cross-elasticities, possessing these elasticity
estimates does not overcome the basic problem of using the analytic results that
indicates whether or not a given marketing mix allocation is optimal to determine
the “optimal” values of the marketing mix given a set of elasticity estimates.
So the “simple” question, “how much should I spend on advertising and promo-
tion?”, does not have a simple answer. While demand elasticities provide a concise
summary of market response at our current levels of marketing effort and enable
us to determine whether or not our current allocation is optimal, they cannot be
used to determine the optimal allocation (if our current allocation is suboptimal).
In order to determine the optimal set of budgets across a portfolio of brands and/or
markets, we need sales response functions that capture the relationships between
sales and all levels of marketing effort.
3 Overview of Methodologies
The processes for determining the budget for a single brand or business unit have
been well covered elsewhere, for example by Broadbent (1997) and Davidson (1997).
4
Over 30 years ago, Little (1966) pragmatically suggested that whatever level of
spending appeared appropriate, at least two other markets should be set aside in
order to test higher and lower levels. In the years since, few companies have adopted
that system partly for lack of available comparable markets and partly because the
returns to marketing expenditure are hard to identify. A more recent development
along these lines has been provided by Lodish et al. (1995).
UK practice is described by Gallagher (2001), as summarised in Russell and
Lane (2002). Approximately 35 percent of the companies surveyed by Gallagher
set budgets on a fixed percentage of anticipated future sales. 9 percent took a
percentage of the previous year’s sales and another 9 percent averaged the last and
next year’s sales. The next most popular method was based on the cost of achieving
pre-set tasks for the advertising (e.g., a designated number of new users). 30 percent
used this approach but that too was combined with percent of anticipated sales. 13
percent set arbitrary amounts based on general fiscal outlook of the company. That
leaves at most 4 percent using more sophisticated means for budget setting.
Urban and Star (1991) discuss the main theoretical methods. While varying in
approach and technique, the models depend on sales response functions. Generally
there are three components of sales response that should be considered: the im-
mediate (direct, one-period) sales impact, the long-term/dynamic impacts, and the
interaction effects between the elements of the marketing mix. These interaction
effects are important as a combination of advertising and promotion typically re-
sults in a combined effect that is more than the mere sum of their individual effects.
These relationships between sales and the various elements of the marketing mix
are captured by a sales response function. Such response functions lie at the heart
of the various commercial models offered by consultancies and agencies. We now
briefly examine some of the offerings currently available in the UK.
5
3.1 Ad Bank
Ad Bank, part of BBDO’s BrandLink toolkit, seeks to define the optimum marketing
budget and its allocation across media, as well as to measure the contribution of
each to brand health and return on investment (Rohr, Sasserath, and Schmidt 1997;
Brody and Finkelberg 1997).
The sales response functions that lie at the heart of this model are calibrated on
historical data using standard regression methods. Sales or market share is viewed
as a function of controllable variables (i.e., the marketing mix) and non-controllable
variables such as competitive effects, demographic and economic factors. The model
seeks to capture both short- and long-term effects of advertising and it may be
broken down by media type. Advertising may be expressed as expenditure or GRPs
(gross rating points). Advertising carry-over is captured by representing advertising
effects as an exponentially smoothed series of advertising expenditures: effective
advertising effort in period t = λ × advertising spend in period t + (1 − λ) ×effective advertising effort in period t − 1.
When the data are available, the model includes competitive effects, particularly
in communication, price, retailer support and new introductions. Seasonality and
long term demographic or usage trends are usually represented by dummy variables.
Typically, forty or more data points are needed to accurately portray the marketplace
(3-4 years of monthly data, 6-7 years of bi-monthly data). A customised model is
built for every brand within a given marketplace.
Given this set of empirical market response functions, resource allocation can
be addressed with or without the constraints of a fixed budget. For multi-brand
allocation the modelling process must reflect the fact that different brands are at
different stages of life-cycle and could have markedly different objectives. The new
brand is building awareness and trial, the slightly older brand is building market
share, while the well-established brand is trying to maximise its cash flow. The
model also reflects halo and cannibalisation effects if there are several brands in one
6
category. In some cases, the allocation across brands is extended over several years,
such as to investigate whether investment spending in a technically new product will
pay over the entire line.
At this stage the input data demands are quite substantial. BBDO is currently
developing a version of the model that will enable estimation of model parameters
from relatively few historical observations by accessing their database of previous
applications.
3.2 AdInvest
AdInvest, from Mindshare’s Advanced Techniques Group, is an economic invest-
ment model that aims to optimise budget allocation by media, brand and country.
Theoretically, elements of marketing mix could be added as another dimension but
due to the nature of Mindshare’s work this has not been necessary.
Once the key stakeholders are identified and objectives defined (to allocate re-
sources where economic return is greatest), the process starts with developing a
framework, which includes both software and brand metrics models.
Sales response curves lie at the heart of the process. Currently these response
curves are estimated through econometric modelling, but in principle could be de-
veloped through structured questionnaire techniques. Econometric models are used
to estimate baseline sales and advertising impacts for every brand. In order to fully
isolate and measure media impact, various data (brand metrics, sales data, compe-
tition, NP launches, price, distribution etc) are used to identify key drivers of brand
value and their response to media investment.
The framework goes on to estimate the change in brand value as a result of the
media investment. The model is built to determine the value of short- and long-term
effects through an analysis of sales, market growth, NPD opportunities, distribution,
cost structure, time and risk.
This modelling process is data intensive, requiring detailed sales data (weekly
7
or monthly), brand metrics, advertising and financial data. Once the analysis is
refined, various scenarios are tested with bespoke profitability optimisation software
using either the Solver facility in Excel or direct analytical methods.
Optimal total budget is usually based on one year sales and allows to deter-
mine optimal allocation ‘intra-year’ at any given moment, reflecting drivers such
as seasonality, new product launches, residual brand values, media synergies and
halo effects, stage in lifecycle etc. The model includes cost structure (media costs,
variable material costs, promotions, fixed costs— for comparisons across countries).
Since few companies can provide detailed and consistent historic data, Mindshare
is considering the development of response curves through discussion with key client
experts. AdInvest is positioned not just as a tool but as a form of decision-making
process—and the process is central.
3.3 Interbrand
Interbrand claims to be the first consulting firm that recognised the economic value
of brands through brand valuation. Their brand valuation model is used to estimate
the net present value of brand earnings in various scenarios (Interbrand 2001a).
Allocation of marketing resources affects the model at every stage of the analysis:
• financially, in the cost structure and revenues streams
• from the customer transaction point of view, influencing different steps of the
consumer decision-making process and driving demand
• at risk estimate level, enhancing Brand Strength and therefore lowering the
discount rate.
This methodology can be applied to optimise budget allocation both for a stand-
alone brand as well as for multiple brands within a brand portfolio (e.g., Unilever)
or different business units within a single-brand company (e.g., American Express).
8
This approach has some interesting implications. First, increased advertising
expenditure can be justified not only because it increases returns in the short term
but also because it increases Brand Strength and therefore Brand Value. Secondly,
increased advertising expenditure may be justifiable even when it does not increase
returns in the short term. It may instead be that it increases returns in the longer
term and that this, combined with the increase in brand strength, can demonstrate
a higher brand value.
3.4 Conclusion
A number of other proprietary budget allocation tools have been developed by agen-
cies and consultants (e.g., CIA MediaLab, McKinsey). Considerable overlap exists
between the proprietary packages available in the UK but commercial confidentiality
does not permit a rigorous comparison and analysis of the various services. What
they have in common is the use of sales response functions and the need for large
amounts of historical data for model calibration. A number of agencies have rightly
pointed to data problems and the need to engage users in iterative use of the tools so
that their experience and intuition can be brought to bear on a number of scenarios.
The basic mathematics underlying these models has been discussed in the aca-
demic literature for the past 30–40 years. Their rarity in practice is a consequence
several factors. All too often, these models have been presented to the client as a
black box which can result in scepticism and non-use. Another characteristic is that
large amounts of data are required for calibrating the sales response functions and
many firms have neither the time nor the money to collect these data. Finally, the
modelling skills and computational software required to implement these models are
beyond the reach of most firms.
In the next section, we present a model that seeks to overcome these three
barriers to usage. The model is developed entirely within an Excel spreadsheet
environment, which is standard on almost every manager’s computer. The sales
9
response functions on which it is based are calibrated using the judgements of the
key managers within the firm. This not only overcomes the data barrier but also
directly includes the managers in the analysis process, thus reducing the “black box”
obstacle to understanding and use. (Managers should only rely on the output of this
type of tool if they can follow how the outputs logically flow from the inputs.)
4 The HAMRAT Model
Given a sales response function fi(xi1, . . . , xiJ) that quantifies the relationship be-
tween the sales for product i (i = 1, . . . , I) and the marketing effort for that product
across the J elements of the marketing mix (denoted by xi1, . . . , xiJ), the market-
response-model based approach to the allocation of marketing resources is a simple
mathematical programming problem.
The basic resource allocation problem is as follows: find the xij (for all i =
1, . . . , I, j = 1, . . . , J) to
maximise Π =I∑
i=1
fi(xi1, . . . , xiJ)mi︸ ︷︷ ︸gross margin
−I∑
i=1
J∑j=1
cj(xij)
︸ ︷︷ ︸marketing spend
(1)
subject to the budget constraint
I∑i=1
J∑j=1
cj(xij) ≤ B (2)
and the non-negativity constraints on all the elements of the marketing mix
xij ≥ 0 (for all i = 1, . . . , I, j = 1, . . . , J) (3)
10
where
mi = contribution margin per unit for product i
cj(·) = cost function for the jth element of the marketing mix
B = marketing budget constraint
If the marketing effort is measured in monetary units (£ or $), c(x) = x. If x is
effort measured in, say, GRPs or # of sales reps, then c(x) maps the effort to its
currency equivalent.
If we want to simultaneously determine the optimal size of the marketing budget
and the optimal allocation of this budget, we remove the budget constraint given
in (2). Should the planning situation dictate, further constraints can be added to
reflect minimum and/or maximum spends on any given product and/or element of
the marketing mix.
This mathematical programming problem can be solved using standard optimi-
sation packages such as the Excel Solver add-in. (However, care must be taken to
avoid local optima given the highly nonlinear nature of the product function.)
The challenges faced when moving from this “theory” to practice is that of speci-
fying and estimating the empirical sales response function for each product. Drawing
on the long tradition of so-called decision calculus models (Little 1970; Blattberg
and Deighton 1996), we will calibrate the model using managers’ judgements. But
first we must specify the function form. We start by assuming that the effects of
the individual elements of the marketing mix are multiplicative; such an assump-
tion underlies the widely-used multiplicative and exponential sales response models
(Hanssens, Parsons, and Schultz 2001). In particular, we have
fi(xi1, . . . , xiJ) = Sbi
J∏j=1
eij(xij)
11
where Sbi is the “base” or status quo sales level for brand i and eij(·) is the effect
index for marketing-mix element j on the sales of brand i. Under base or status
quo conditions (i.e., xbi1, . . . , x
biJ), the eij(·) = 1 (i.e., we specify the eij(·) such that
eij(xbij) = 1). Suppose a new marketing programme decreases the spend on the first
element of the marketing mix such that ei1(xi1) = 0.85 and increases the spend on
the second element of the marketing mix such that ei2(xi2) = 1.35. The net impact
on sales is 0.85 × 1.35 = 1.1475, i.e., a 14.75% increase in sales over the status quo.
A wide variety of judgement-based submodels for the eij(·) are discussed in Little
(1975); also see Albers (1997). The specific form used in this paper is based Lodish’s
(1971) use of two ADBUDG functions in a piece-wise manner.
The ADBUDG function proposed by Little (1970) is the prototypical response
function used in judgement-based market response modelling efforts. It is a four-
parameter curve of the form
f(x) = β + (α − β)xγ
δ + xγ(4)
that is quite flexible and can be either S-shaped (γ > 1) or concave (γ < 1). We
elicit judgements of what sales would be with (i) zero marketing effort, (ii) current
marketing effort, (iii) a 50% increase in marketing effort, and (iv) a saturation-level
of marketing effort. The four parameters of (4) are uniquely determined by these
four sales numbers.
A problem with estimating the model parameters in this way is that the shape
of the curve is not based on any judgment of what sales would be with a level of
marketing effort between 0 and current. As a result, we may not have a lot of faith
in the sales estimates derived from the sales response function for levels of marketing
effort between 0 and current. One solution is to elicit a fifth judgement of sales: what
sales would be with a 50% decrease in marketing effort. We can then fit (4) to these
five data point using non-linear least-squares. Lodish (1971) experienced difficulties
12
with this and therefore used pieces of two ADBUDG functions for different areas
of the response curve. That is, one function is fit through the zero, 50% decrease,
current, and saturation points and is used as the response curve when the marketing
effort is between zero and the current level. Another function is fit through the zero,
current, 50% increase, and saturation points and is used as the response curve when
the marketing effort is above the current level.
Therefore, the functional form we use for the eij(·) is
eij(xij) =
βij + (αij − βij)(xij/xb
ij)γl
ij
δlij + (xij/xb
ij)γl
ij
if xij ≤ xbij
βij + (αij − βij)(xij/xb
ij)γu
ij
δuij + (xij/xb
ij)γu
ijif xij > xb
ij
We estimate the six parameters (αij , βij , γlij , γ
uij , δ
lij , δ
uij) in the following manner.
For each element of the marketing mix for each product, we elicit judgements of
what sales would be with (i) zero marketing effort, (ii) a 50% decrease in marketing
effort, (iii) no change in marketing effort, (iv) a 50% increase in marketing effort,
and (v) a saturation-level of marketing effort. These can be elicited in the following
manner:
Assume that the current sales for product i are indexed at 100. Based
on your knowledge the market, what would have happened to the sales
of this product if it received
• no spend on [element j of the marketing mix]?
• a 50% decrease in effort on [element j of the marketing mix]?
• no change in effort on [element j of the marketing mix]?
• a 50% increase in effort on [element j of the marketing mix]?
• a saturation level of effort on [element j of the marketing mix]?
13
(Assume that the spend on all the other elements of the marketing mix
is at that status quo level.)
Denoting the answers to these five questions by E0ij , E−50%
ij , Ecurrij , E+50%
ij , and E∞ij ,
it can be shown that:
αij = E∞ij /100
βij = E0ij/100
γlij = ln
[(E∞
ij − Ecurrij
E∞ij − E−50%
ij
)(E−50%
ij − E0ij
Ecurrij − E0
ij
)]/ln(0.5)
γuij = ln
[(E∞
ij − Ecurrij
E∞ij − E+50%
ij
)(E+50%
ij − E0ij
Ecurrij − E0
ij
)]/ln(1.5)
δlij =
(Ecurr
ij
100
)γlij
(E∞
ij − Ecurrij
Ecurrij − E0
ij
)
δuij =
(Ecurr
ij
100
)γuij
(E∞
ij − Ecurrij
Ecurrij − E0
ij
)
The set of six parameters are computed for each element of the marketing mix, for
each product. (Note that if the expected sales level for product i with no change
in effort on the jth element of the marketing mix is the current sales level (i.e.,
Ecurrij = 100), then δl
ij = δuij .)
We call this judgement-based marketing resource allocation model “HAMRAT”
for the purpose of easy reference.
4.1 Issues in Judgement Elicitation
While the judgements of just one person can be used for model calibration, the
estimation of the sales response functions should ideally involve the knowledge and
experience of all participants in the budgetary process. The role of an individual in
the firm may bias response expectations and individual managers may sense corpo-
rate priorities differently. For example, a brand manager may be more optimistic
14
about the potential response of his own brand compared to other brands competing
for the same resources.
There are several ways of conducting the estimation procedure:
• Analyst-selected pooling methods:
Several experts provide their estimates. If their opinions are quite similar,
the average of the estimates is used. A substantial similarity of independent
estimates has the effect of heightening the decision-makers’ confidence in the
estimation. On the other hand, should there be substantial divergence in the
estimates of two or more experts, one can either use the estimate of a favoured
expert, or assign some weights for combining the estimates. Winkler (1968)
distinguishes four logical bases for assigning the weights:
1. Equal if the relative expertise of each participant is unknown,
2. Proportional to perceived (by the rest of the team) expertise,
3. Proportional to the experts’ self-ratings of their competence, and
4. Proportional to their past predictive accuracy.
• Group-selected pooling methods:
If the group itself is asked to resolve its differences, there are two common
ways to do this: co-operatively or by the Delphi method.
In a cooperative group, questions or differences are discussed openly, and the
group continues discussion until a single collective answer is reached. Although
very common, this method is viewed with some misgivings because an actual
confrontation of experts is likely to create certain psychological effects that
may spoil the independence of the experts’ estimation processes.
The Delphi estimation procedure (Sackman 1975) has three key features:
1. Anonymous response, in which judgments about sales response of each
brand are obtained formally but anonymously;
15
2. Interaction and controlled feedback, involving open discussions of the
summarised statistical responses of the group
3. Statistical group response, where group opinion is an aggregate of indi-
vidual opinions in the final round.
4. The procedure is repeated several times until group consensus is reached.
If the group reaches a narrow range of inputs indicating similar (credible) max-
ima, then the real world results are unlikely to be sensitive to any solution within
that range.
Quantifying judgements can be a very useful exercise in itself since it ensures
that a problem is given a greater thought, especially if the numbers are a matter of
record. It also pinpoints the extent and importance of differences among executives.
We suggest that the means by which consensus is reached is less important than
the fact that consensus is achieved. Of course, consensus does not imply that the
solution is optimal, only that the group’s intention has been defined. If we find
that the two sets of consensus results emerge, it easy to run the model twice, once
for each set of judgement, to see how sensitive the budgetary allocations are to the
input judgements.
4.2 Extension to the Basic Model
Ambler (2000) recommends that any marketing budgetary process should also report
changes in brand equity. Therefore, in addition to optimising the forecast profit
contribution, HAMRAT estimates the incremental addition to brand equity from the
marketing communications (marcomms) budget. We assume that this is the only
part of the mix to increase brand equity. Should this not be the case, adjustments
would be needed. By “brand equity” we mean “customer-based brand equity” as
defined by Keller (1998).
Of course, if marcomms only affect the plan period, no adjustment for brand
16
equity is needed, otherwise change of brand equity needs to be considered alongside
profit (Ambler 2000). Alternatively, if marcomms are on a maintenance basis, the
brand equity at the end of the plan period will be equal to that at the beginning
and there will be no need to reflect any changes in the brand equity.
While it is possible to do so, we do not combine the profit and brand equity
effects because we believe the short- (plan) and long-term effects, for which the
change in brand equity is a proxy, should be considered separately.
Keller (1998), citing Rubinson (1992), states that brand equity measurement is
essentially multivariate. Whilst we agree with that, our problem was to introduce
some longer term consideration into this type of modelling, perhaps for the first
time. We needed to be economical with the data, not least because users would be
impatient with a large amount of input purely for this secondary effect.
The CEO of Unilever has referred to a brand “as a reservoir, if you like, of future
cash flow” (Fitzgerald 2001, p.22). In other words, the profit that will be earned
as a result of the period’s marcomms, but which was not taken in the period itself,
has topped up the reservoir and can now be used as an estimate of the incremental
brand equity. This is given by the carry-over indicated by the decay estimate. In
other words, if only 70 percent of the budget is burned up, so to speak, in the plan
period, 30 percent of the incremental profits are deemed to fall in the following year.
To the simple estimate of sales, and thus profit, carry-over (Kotler 1997, p. 639),
we additionally factor in the change in share of voice. This second-order effect
reflects the dynamic of the market. It is widely believed (e.g. Kotler 1997, p. 659)
that changing the share of voice will nudge market share in the same direction, other
things being equal.
It follows that the change in brand equity for product i (∆BE i) is calculated as
follows:
∆BE i = Sales i × mi × BEdr i × Forecast SOVi
SOVi
17
where
Sales i = sales of product i with optimal allocation of effort
BEdr i = brand equity decay rate for product i
SOVi = (current) share-of-voice for product i
and the forecast share-of-voice for product i is computed as follows:
Forecast SOVi =MC∗
i
MC∗i +
CIi
100(100 − SOVi)
SOViMCi
where
MCi = current marcomms spend for product i
MC∗i = optimal (i.e., model output) marcomms spend for product i
CIi = forecast increase in competitor marcomms spend (100 = no change)
5 A Worked Example
To illustrate the workings of HAMRAT, we present the disguised analysis developed
for a UK FMCG company.
The first step is to build a status quo picture, filling in current data for each
brand. The model is adjustable for different brand portfolios; more or fewer brands
can be accommodated by copying or deleting worksheet columns. Central to the
change in brand equity measure are the share of voice and decay rates for each brand:
share of voice reflects ad spend for the brand as a percentage of total marcomms
expenditure in the market and brand decay rate is calculated as a percentage of
marcomms not used in the forecast period. Table 1 shows the base data, e.g.,
current year, for the five brands Alpha to Echo.
18
——————————————[ Table 1 about here ]
——————————————
The next step is to estimate the sales response given different marketing spend
as well as of the expected competitor response (percentage of marketing spend in the
forecast period compared to current. If there is no increase, competitive response
is 100, i.e., 100 percent of current). The data on competitive response is used to
calculate change in the SOV; they are not directly incorporated in the market re-
sponse functions as such effects are assumed to have been captured in the managers’
judgements. Table 2 shows an example of the expected responses to various expen-
diture levels. In this example, the “Other” element of the marketing non-variable
expenditures (e.g. research, PR) do not have any impact on sales and consequently
all the judgement inputs are set to 100 and this submodel effectively drops out of
the analysis.
——————————————[ Table 2 about here ]
——————————————
Table 3 reports the optimal allocation given the objective of maximising gross
contribution with no constraint placed on the budget size. We observe that both the
optimal marketing spend and gross contribution are more than double the current
level. This analysis could be repeated whereby we add the constraint that the total
marketing spend is equal to the current level. Similarly, we could pre-set ranges for
each element of the marketing mix for each brand.
——————————————[ Table 3 about here ]
——————————————
6 Conclusions
The development of a number of packages by agencies and consultancies indicates a
growing interest in optimising marketing expenditures across markets, brands and
19
the marketing mix. After briefly reviewing both the theory and practical consid-
erations, we presented HAMRAT as a useful approach to this problem. HAMRAT
is a decision calculus model that can be implemented within an Excel spreadsheet
that combines judgmental estimates of underlying response phenomena in order to
calculate optimal expenditure for each brand and element of the mix. Furthermore,
it reports the changes in brand equity resulting from the optimised allocation of
marketing resources.
Used iteratively it should clarify implicit assumptions about sales response curves
and achieve consensus. Making these assumptions explicit may prove to be the
principle benefit for agency-client relationships. As an open solution, it can be
developed by practitioners for their own purposes or used to benchmark commercial
tools. We share the view that such models should be used interactively by a team of
managers bringing their knowledge and experience to bear on the budgeting process.
The main limitations of this tool include the focus on sales response curves
which do not reflect price variations. Incorporating price as an input would increase
realism but also complexity and demands on the managers providing the required
judgements. Other extensions to this basic model include the explicit integration of
judgemental inputs with historical data to calibrate the market response functions
and an extension from a single period model to a multi-period model that explicitly
incorporates market dynamics.
In practice we expect HAMRAT to develop in the light of usage by practising
managers.
20
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Total Alpha Bravo Charlie Delta EchoRevenue 140 87 14 7 10 22Margin 40% 40% 40% 40% 40%Marketing Spend:Marcomms 9.73 5.50 0.29 0.04 1.50 2.40Promotions 5.60 3.80 0.20 0.02 1.50 1.80Other 1.44 1.20 0.04 0.00 0.16 0.04
Total Mktg Spend 18.48 10.50 0.53 0.06 3.16 4.24Gross Contribution 37.52 24.30 5.07 2.74 0.84 4.56Brand Equity:Share of voice 40 20 30 40 20Decay rate 30% 20% 15% 20% 20%
Table 1: Base Data
23
Alpha Bravo Charlie Delta EchoMarketing communications:no spend 30 30 30 30 3050% decrease 50 40 50 50 50current effort 100 90 100 100 12050% increase 125 110 125 125 170saturation 155 120 160 160 200
Forecast competitor increase 105 100 100 100 110Promotion:no spend 35 30 30 35 2550% decrease 50 45 45 50 5050% increase 120 110 130 130 170saturation 140 115 155 160 200
Other:no spend 100 100 100 100 10050% decrease 100 100 100 100 100current effort 100 100 100 100 10050% increase 100 100 100 100 100saturation 100 100 100 100 100
Table 2: Judgement Estimates for Sales Response Functions
24
Total Alpha Bravo Charlie Delta EchoMarketing Spend:Marcomms 21.91 12.56 0.58 0.22 2.56 6.00Promotion 16.49 8.79 0.39 0.11 2.58 4.63Other 1.44 1.20 0.04 0.00 0.16 0.04
Total 39.84 22.54 1.01 0.33 5.29 10.66Revenue 295.77 162.09 18.62 16.99 18.05 80.02Gross Contribution 78.47 42.29 6.43 6.46 1.93 21.35Change in brand equity 7.81 5.14 0.22 0.34 0.28 1.82
Table 3: Model Output
25
Figure 1: Illustrative Sales Response Functions
(a)
(b)
Marketing Input
Sale
s
Marketing Input
Sale
s