Margin Of Error

The larger the margin of error, the less confidence one should have that a poll result would reflect the result of a census of the entire population. The margin of error will be positive whenever a population is incompletely sampled and the outcome measure has positive variance, which is to say, whenever the measure varies.

The term margin of error is often used in non-survey contexts to indicate observational error in reporting measured quantities.

Consider a simple yes/no poll ${\displaystyle P}$  as a sample of ${\displaystyle n}$  respondents drawn from a population ${\displaystyle N{\text{, }}(n\ll N)}$  reporting the percentage ${\displaystyle p}$  of yes responses. We would like to know how close ${\displaystyle p}$  is to the true result of a survey of the entire population ${\displaystyle N}$ , without having to conduct one. If, hypothetically, we were to conduct poll ${\displaystyle P}$  over subsequent samples of ${\displaystyle n}$  respondents (newly drawn from ${\displaystyle N}$ ), we would expect those subsequent results ${\displaystyle p_{1},p_{2},\ldots }$  to be normally distributed about ${\displaystyle {\overline {p}}}$ , the true but unknown percentage of the population. The margin of error describes the distance within which a specified percentage of these results is expected to vary from ${\displaystyle {\overline {p}}}$ .

According to the 68-95-99.7 rule, we would expect that 95% of the results ${\displaystyle p_{1},p_{2},\ldots }$  will fall within about two standard deviations (${\displaystyle \pm 2\sigma _{P}}$ ) either side of the true mean ${\displaystyle {\overline {p}}}$ .  This interval is called the confidence interval, and the radius (half the interval) is called the margin of error, corresponding to a 95% confidence level.

Generally, at a confidence level ${\displaystyle \gamma }$ , a sample sized ${\displaystyle n}$  of a population having expected standard deviation ${\displaystyle \sigma }$  has a margin of error

${\displaystyle MOE_{\gamma }=z_{\gamma }\times {\sqrt {\frac {\sigma ^{2}}{n}}}}$ 

where ${\displaystyle z_{\gamma }}$  denotes the quantile (also, commonly, a z-score), and ${\displaystyle {\sqrt {\frac {\sigma ^{2}}{n}}}}$  is the standard error.

We would expect the average of normally distributed values  ${\displaystyle p_{1},p_{2},\ldots }$  to have a standard deviation which somehow varies with ${\displaystyle n}$ . The smaller ${\displaystyle n}$ , the wider the margin. This is called the standard error ${\displaystyle \sigma _{\overline {p}}}$ .

For the single result from our survey, we assume that ${\displaystyle p={\overline {p}}}$ , and that all subsequent results ${\displaystyle p_{1},p_{2},\ldots }$  together would have a variance ${\displaystyle \sigma _{P}^{2}=P(1-P)}$ .

${\displaystyle {\text{Standard error}}=\sigma _{\overline {p}}\approx {\sqrt {\frac {\sigma _{P}^{2}}{n}}}\approx {\sqrt {\frac {p(1-p)}{n}}}}$

Note that ${\displaystyle p(1-p)}$  corresponds to the variance of a Bernoulli distribution.

 

For a confidence level ${\displaystyle \gamma }$ , there is a corresponding confidence interval about the mean ${\displaystyle \mu \pm z_{\gamma }\sigma }$ , that is, the interval ${\displaystyle [\mu -z_{\gamma }\sigma ,\mu +z_{\gamma }\sigma ]}$  within which values of ${\displaystyle P}$  should fall with probability ${\displaystyle \gamma }$ . Precise values of ${\displaystyle z_{\gamma }}$  are given by the quantile function of the normal distribution (which the 68-95-99.7 rule approximates).

Note that ${\displaystyle z_{\gamma }}$  is undefined for ${\displaystyle |\gamma |\geq 1}$ , that is, ${\displaystyle z_{1.00}}$  is undefined, as is ${\displaystyle z_{1.10}}$ .

${\displaystyle \gamma }$	${\displaystyle z_{\gamma }}$		${\displaystyle \gamma }$	${\displaystyle z_{\gamma }}$
0.84	0.994457883210		0.9995	3.290526731492
0.95	1.644853626951		0.99995	3.890591886413
0.975	1.959963984540		0.999995	4.417173413469
0.99	2.326347874041		0.9999995	4.891638475699
0.995	2.575829303549		0.99999995	5.326723886384
0.9975	2.807033768344		0.999999995	5.730728868236
0.9985	2.967737925342		0.9999999995	6.109410204869

Since ${\displaystyle \max \sigma _{P}^{2}=\max P(1-P)=0.25}$  at ${\displaystyle p=0.5}$ , we can arbitrarily set ${\displaystyle p={\overline {p}}=0.5}$ , calculate ${\displaystyle \sigma _{P}}$ , ${\displaystyle \sigma _{\overline {p}}}$ , and ${\displaystyle z_{\gamma }\sigma _{\overline {p}}}$  to obtain the maximum margin of error for ${\displaystyle P}$  at a given confidence level ${\displaystyle \gamma }$  and sample size ${\displaystyle n}$ , even before having actual results.  With ${\displaystyle p=0.5,n=1013}$ 

${\displaystyle MOE_{95}(0.5)=z_{0.95}\sigma _{\overline {p}}\approx z_{0.95}{\sqrt {\frac {\sigma _{P}^{2}}{n}}}=1.96{\sqrt {\frac {.25}{n}}}=0.98/{\sqrt {n}}=\pm 3.1\%}$ 
${\displaystyle MOE_{99}(0.5)=z_{0.99}\sigma _{\overline {p}}\approx z_{0.99}{\sqrt {\frac {\sigma _{P}^{2}}{n}}}=2.58{\sqrt {\frac {.25}{n}}}=1.29/{\sqrt {n}}=\pm 4.1\%}$ 

Also, usefully, for any reported ${\displaystyle MOE_{95}}$ 

${\displaystyle MOE_{99}={\frac {z_{0.99}}{z_{0.95}}}MOE_{95}\approx 1.3\times MOE_{95}}$ 

If a poll has multiple percentage results (for example, a poll measuring a single multiple-choice preference), the result closest to 50% will have the highest margin of error. Typically, it is this number that is reported as the margin of error for the entire poll. Imagine poll ${\displaystyle P}$  reports ${\displaystyle p_{a},p_{b},p_{c}}$  as ${\displaystyle 71\%,27\%,2\%,n=1013}$ 

${\displaystyle MOE_{95}(P_{a})=z_{0.95}\sigma _{\overline {p_{a}}}\approx 1.96{\sqrt {\frac {p_{a}(1-p_{a})}{n}}}=0.89/{\sqrt {n}}=\pm 2.8\%}$  (as in the figure above)

${\displaystyle MOE_{95}(P_{b})=z_{0.95}\sigma _{\overline {p_{b}}}\approx 1.96{\sqrt {\frac {p_{b}(1-p_{b})}{n}}}=0.87/{\sqrt {n}}=\pm 2.7\%}$ 

${\displaystyle MOE_{95}(P_{c})=z_{0.95}\sigma _{\overline {p_{c}}}\approx 1.96{\sqrt {\frac {p_{c}(1-p_{c})}{n}}}=0.27/{\sqrt {n}}=\pm 0.8\%}$ 

As a given percentage approaches the extremes of 0% or 100%, its margin of error approaches ±0%.

Imagine multiple-choice poll ${\displaystyle P}$  reports ${\displaystyle p_{a},p_{b},p_{c}}$  as ${\displaystyle 46\%,42\%,12\%,n=1013}$ . As described above, the margin of error reported for the poll would typically be ${\displaystyle MOE_{95}(P_{a})}$ , as ${\displaystyle p_{a}}$ is closest to 50%. The popular notion of statistical tie or statistical dead heat, however, concerns itself not with the accuracy of the individual results, but with that of the ranking of the results. Which is in first?

If, hypothetically, we were to conduct poll ${\displaystyle P}$  over subsequent samples of ${\displaystyle n}$  respondents (newly drawn from ${\displaystyle N}$ ), and report result ${\displaystyle p_{w}=p_{a}-p_{b}}$ , we could use the standard error of difference to understand how ${\displaystyle p_{w_{1}},p_{w_{2}},p_{w_{3}},\ldots }$  is expected to fall about ${\displaystyle {\overline {p_{w}}}}$ . For this, we need to apply the sum of variances to obtain a new variance, ${\displaystyle \sigma _{P_{w}}^{2}}$ ,

${\displaystyle \sigma _{P_{w}}^{2}=\sigma _{P_{a}-P_{b}}^{2}=\sigma _{P_{a}}^{2}+\sigma _{P_{b}}^{2}-2\sigma _{P_{a},P_{b}}=p_{a}(1-p_{a})+p_{b}(1-p_{b})+2p_{a}p_{b}}$ 

where ${\displaystyle \sigma _{P_{a},P_{b}}=-P_{a}P_{b}}$  is the covariance of ${\displaystyle P_{a}}$ and ${\displaystyle P_{b}}$ .

Thus (after simplifying),

${\displaystyle {\text{Standard error of difference}}=\sigma _{\overline {w}}\approx {\sqrt {\frac {\sigma _{P_{w}}^{2}}{n}}}={\sqrt {\frac {p_{a}+p_{b}-(p_{a}-p_{b})^{2}}{n}}}=0.029,P_{w}=P_{a}-P_{b}}$

${\displaystyle MOE_{95}(P_{a})=z_{0.95}\sigma _{\overline {p_{a}}}\approx \pm {3.1\%}}$ 

${\displaystyle MOE_{95}(P_{w})=z_{0.95}\sigma _{\overline {w}}\approx \pm {5.8\%}}$ 

Note that this assumes that ${\displaystyle P_{c}}$  is close to constant, that is, respondents choosing either A or B would almost never chose C (making ${\displaystyle P_{a}}$ and ${\displaystyle P_{b}}$  close to perfectly negatively correlated). With three or more choices in closer contention, choosing a correct formula for ${\displaystyle \sigma _{P_{w}}^{2}}$  becomes more complicated.

The formulae above for the margin of error assume that there is an infinitely large population and thus do not depend on the size of population ${\displaystyle N}$ , but only on the sample size ${\displaystyle n}$ . According to sampling theory, this assumption is reasonable when the sampling fraction is small. The margin of error for a particular sampling method is essentially the same regardless of whether the population of interest is the size of a school, city, state, or country, as long as the sampling fraction is small.

In cases where the sampling fraction is larger (in practice, greater than 5%), analysts might adjust the margin of error using a finite population correction to account for the added precision gained by sampling a much larger percentage of the population. FPC can be calculated using the formula

${\displaystyle \operatorname {FPC} ={\sqrt {\frac {N-n}{N-1}}}}$ 

...and so, if poll ${\displaystyle P}$  were conducted over 24% of, say, an electorate of 300,000 voters,

${\displaystyle MOE_{95}(0.5)=z_{0.95}\sigma _{\overline {p}}\approx {\frac {0.98}{\sqrt {72,000}}}=\pm 0.4\%}$ 
${\displaystyle MOE_{95_{FPC}}(0.5)=z_{0.95}\sigma _{\overline {p}}{\sqrt {\frac {N-n}{N-1}}}\approx {\frac {0.98}{\sqrt {72,000}}}{\sqrt {\frac {300,000-72,000}{300,000-1}}}=\pm 0.3\%}$ 

Intuitively, for appropriately large ${\displaystyle N}$ ,

${\displaystyle \lim _{n\to 0}{\sqrt {\frac {N-n}{N-1}}}\approx 1}$ 
${\displaystyle \lim _{n\to N}{\sqrt {\frac {N-n}{N-1}}}=0}$ 

In the former case, ${\displaystyle n}$  is so small as to require no correction. In the latter case, the poll effectively becomes a census and sampling error becomes moot.

• Engineering tolerance
• Key relevance
• Measurement uncertainty
• Random error