Sampling Methods Part IV: Census Techniques PDF

Summary

This document discusses various sampling methods for estimating populations, including area-based methods like quadrats and line transects, and non-area-based methods such as mark-recapture and selective removal. These methods are crucial in ecology and biodiversity management.

Full Transcript

SAMPLING METHODS
PART IV:
CENSUS TECHNIQUES

Biodiversity Management 1B
 3. SAMPLING
Most widely used of the three census techniques
Two basic approaches are considered

AREA BASED NON-AREA BASED
SAMPLING SAMPLING

Usually involves Usually involves
sampling during a sampling at more
single time period than one time period
 3. SAMPLING – DECISION PATH
SAMPLING APPROACHES

AREA BASED NON-AREA BASED
SAMPLING SAMPLING

PLOTS PLOTLESS CHANGE IN RATIO REGRESSION

QUADRATS
NON-STANDARD STRIP SELECTIVE REMOVAL
STANDARD STRIP SAMPLING
SAMPLING MARK-RECAPTURE
 AREA BASED SAMPLING
Whether plot or plotless sampling is used, some form
of the basic equation P = D x A applies, where
P = Population number
D = Density (number of animals per unit area)
A = Surface area (i.e. total area occupied by animals)

The method (plot/plotless) determines how “D” is
calculated
 AREA BASED: PLOT SAMPLING
For plot sampling “D” is calculated using the equation:
𝑦
𝐷=
𝑎
Where: D = number of animals per unit area
y = number of animals in a sample plot
a = area of the sampling plot
Shape of plot indicates whether Quadrats or Standard Strip
Sampling is used
Remember we already covered Quadrats (the same applies
here)
How do we calculate density using quadrats?
What two aspects could affect the accuracy of estimates?
 AREA BASED: PLOT SAMPLING
STANDARD STRIP SAMPLING
Narrow, long plots with a fixed width (i.e. fixed transect
lines) → same as Belt Transects
Equation to calculate density is as follows:
𝑦
𝐷=
𝐿𝑊
Where:
D = number of animals per unit area
y = number of animals in a sample plot
L = length of strip
W = width of strip
NB! Remember “y” is not a total number but a
mean calculated from each transect or plot
 AREA BASED: PLOT SAMPLING
STANDARD STRIP SAMPLING
Example: Consider a ranger having to estimate the
population of Zebra within a game reserve that has an
area of 3000 ha. He uses 10 randomly placed strip
samples, each measuring 1000 m x 1000 m (100 ha).
His results are as follows:

Strip 1 2 3 4 5 6 7 8 9 10

Number 5 8 3 11 16 6 7 13 18 21
of Zebra

What is the estimated density or
population of zebra in the reserve?
 AREA BASED: PLOT SAMPLING
STANDARD STRIP SAMPLING
Example: Estimating Zebra density in a game reserve

𝑦
𝐷=
𝐿𝑊

y = mean number of animals = 108/10 = 10.8
 AREA BASED: PLOT SAMPLING
STANDARD STRIP SAMPLING
Example: Estimating Zebra density in a game reserve

𝑦
𝐷=
𝐿𝑊

y = mean number of animals = 108/10 = 10.8
Sampled Area = 100 ha
 AREA BASED: PLOT SAMPLING
STANDARD STRIP SAMPLING
Example: Estimating Zebra density in a game reserve

𝑦
𝐷=
𝐿𝑊

y = mean number of animals = 108/10 = 10.8
Sampled Area = 100 ha
Density = 10.8/100 = 0.108 zebra per 100 ha
 AREA BASED: PLOT SAMPLING
STANDARD STRIP SAMPLING
Example: Estimating Zebra density in a game reserve

𝑦
𝐷=
𝐿𝑊

y = mean number of animals = 108/10 = 10.8
Sampled Area = 100 ha
Density = 10.8/100 = 0.108 zebra per 100 ha
Population in reserve = 0.108 x 3000 = 324
Therefore it’s estimated that there are 324 Zebra in the reserve.
 3. SAMPLING – DECISION PATH
SAMPLING APPROACHES

AREA BASED NON-AREA BASED
SAMPLING SAMPLING

PLOTS PLOTLESS CHANGE IN RATIO REGRESSION

QUADRATS
NON-STANDARD STRIP SELECTIVE REMOVAL
STANDARD STRIP SAMPLING
SAMPLING MARK-RECAPTURE
AREA BASED: PLOTLESS SAMPLING
Plotless methods do not involve counting animals
within a sample plot of given dimensions
The area per animal rather than the animals per area
is sampled
NON-STANDARDISED STRIP SAMPLING also referred
to as the Line Intercept method
NB: Many different ways to measure and calculate
densities from the Line Intercept method
AREA BASED: PLOTLESS SAMPLING
Non-standardised Strip Sampling or Line Intercept
method Example 1:
Using one line in a small open reserve
AREA BASED: PLOTLESS SAMPLING
Non-standardised Strip Sampling or Line Intercept
method Example 1:
- Four animals were observed from the line AB
→ 1 animal on 1st perpendicular line (10 m)
→ 1 animal on 2nd perpendicular line (15 m)
→ 2 animals on 3rd perpendicular line (15 m)
- 15 m was the widest distance that animals were
observed so take twice 15 m multiplied by the
length of the line AB (100 m)
- Area of measurement = 100 m x 15 m x 2 = 3000 m2
AREA BASED: PLOTLESS SAMPLING
Non-standardised Strip Sampling or Line Intercept
method Example 1:
- Area of measurement = 100 m x 15 m x 2 = 3000 m2
- Area per animal is therefore 3000/4 = 1 per 750 m2
- If the area of the reserve is 4500 m2 then we could
estimate that there are 6 animals in the reserve
How was this value concluded?
4500/750
AREA BASED: PLOTLESS SAMPLING
Non-standardised Strip Sampling or Line Intercept
method Example 2:
In a large reserve, more than one line transect can be
used
AREA BASED: PLOTLESS SAMPLING
Non-standardised Strip Sampling or Line Intercept
method Example 2:
- For each of the four transect lines, the same method
as in the previous example is used
- All perpendicular distances are added and the mean
distance is calculated as Y
- All animals recorded are denoted as N
- Total length of the four transect lines are added up
and denoted as X
The Density = N/2XY and this can be extrapolated to
total area as was done previously
 3. SAMPLING – DECISION PATH
SAMPLING APPROACHES

AREA BASED NON-AREA BASED
SAMPLING SAMPLING

PLOTS PLOTLESS CHANGE IN RATIO REGRESSION

QUADRATS
NON-STANDARD STRIP SELECTIVE REMOVAL
STANDARD STRIP SAMPLING
SAMPLING MARK-RECAPTURE
 NON-AREA BASED SAMPLING
Does not take area into account when estimating
population numbers
Involves two separate periods of measurement (i.e.
sampling is undertaken once and after a certain
amount of time has passed, another sampling session
occurs)

X X
X
NON-AREA BASED: MARK-RECAPTURE
Based on trapping/catching, marking and releasing a
known number of marked animals into the population
At another time period, individuals are recaptured
from the population
The ratio of marked to unmarked individuals in the
sample is then used to estimate the total population
NON-AREA BASED: MARK-RECAPTURE
Assumptions:
1. All individuals in the population have an = chance of
capture
2. Ratio of marked to unmarked individuals remains the
same from time of capture to time of recapture
3. Marked individuals redistribute themselves
homogeneously throughout the population wrt
unmarked ones
4. Marked individuals do not lose their marks
5. The population is closed (i.e. no emigration or
immigration)
NON-AREA BASED: MARK-RECAPTURE
The Lincoln index is used to calculate the relative
population size:
𝑛𝑋𝑀
𝑁=
𝑅
Where N = Estimated population, M = animals marked
in first survey, n = total animals counted in second
survey and R = number of marked animals in the second
survey
NON-AREA BASED: MARK-RECAPTURE
EXAMPLE: Sample of 200 fish were tagged in a lake.
After allowing time for the fish to mix with the
population, a second sample of 450 fish were caught
and only 15 of them were found to be tagged. Using
the Lincoln Index, estimate the population of fish in
the lake.
𝑛𝑋𝑀
𝑁=
𝑅
450 × 200
N=
15
90 000
N=
15
N = 6000
NON-AREA BASED: MARK-RECAPTURE
Estimates are subject to sampling error. Therefore, to
get a better estimate we can calculate the standard
error as:
𝑀2 ×(𝑛 −𝑅) 2002 × (450 − 15)
𝑆𝐸 = 𝑆𝐸 =
𝑅3 153

40 000 × (435)
𝑆𝐸 =
3 375

17 400 000
𝑆𝐸 =
3 375

𝑆𝐸 = 5 155.55556
𝑆𝐸 = 71.8021975 = 71.80
NON-AREA BASED: MARK-RECAPTURE
Next step is to calculate a 95% confidence limit (CL):
95% CL = Estimated population (N) ± SE x 1.96
CL at the upper limit = 6000 + 71.80 X 1.96
= 6 140.728 = 6 141
CL at the lower limit = 6000 – 71.80 x 1.96
= 5 859.272 = 5 859

Therefore, we are
95% confident that
the lake has
between 5 859 and
6 141 fish.
 NON-AREA BASED: EXERCISE
QUESTION 1: Mark-recapture

A total of 150 tortoises were caught on Dassen Island and
were marked. They were released back into the habitat. A
week later, a total of 180 tortoises were caught and only
25 of them were marked.
Estimate a) the population of tortoises on the Island using
𝑛𝑋𝑀
the formula 𝑁 =
𝑅
b) Indicate the upper and lower population estimates by
M2 ×(n −R)
calculating the standard error (SE = R3
) and 95%
confidence limits (N ± SE x 1.96)

PRACTICE THIS EXAMPLE
NON-AREA BASED: SELECTIVE REMOVAL
Involves removal of individuals from the population
which often influences ratios of age, sex or two types
of animals
This method therefore considers changes in ratios,
involving two periods of sampling
1st survey 2nd survey
Male Female Male Male Female Male

Male Male Female Male Male Male

Certain number of individuals removed
NON-AREA BASED: SELECTIVE REMOVAL
Assumptions:
1. The population is essentially stationary
2. Probability of capture during trapping period is equal
for each animal exposed to capture
3. Probability of capture remains constant from trapping
to trapping

NB: Last assumption requires that the animals are not trap-
shy or trap-prone and requires that bait acceptance,
weather conditions and differences in sex and age will not
affect the probability of capture

Challenging to meet these assumptions
NON-AREA BASED: SELECTIVE REMOVAL
The first (initial) survey determines the ratio of the variable
and the second survey involves determining the changed
ratio between recording periods
The ratios are used in a formula to estimate the population
at the time of the first survey (N1 )
(𝑇𝑥 − 𝑉2 × 𝑇 )
N1 =
(𝑉2 −𝑉1 )
Where:
N1 = Population estimate at first survey time
V1 = Ratio of one variable during first survey
V2 = Ratio of same variable at second survey
Tx = Number of animals of variable x that were added or removed between
surveys
T = Tx + Ty , where Ty = number of animals of variable y (second gender or age
etc.) that were added or removed between surveys
NON-AREA BASED: SELECTIVE REMOVAL
EXAMPLE: A researcher was interested in estimating
how many impala there are in a game reserve. He
decides to use the Selective Removal method using
gender as the variable. A first survey of 100 impala
found that there were 64 ewes and 36 rams. The
proportion of ewes is thus 0.64 (V1)
He then removed 50 ewes (Tx = – 50) and 10 rams
(Ty = –10)
Both the values of 50 and 10 are negative because the
animals are being removed
NON-AREA BASED: SELECTIVE REMOVAL
EXAMPLE cont.: A second survey was conducted a
week later and the ewes now only formed 51% of the
population. Using the information provided, estimate
the initial population, N1.
(𝑇𝑥 − 𝑉2 × 𝑇 )
N1 =
(𝑉2 −𝑉1 )

(−50− 0.51×−60 )
N1 =
(0.51−0.64)

−50 −(−30.6)
N1 =
−0.13
−19.4
N1 = = 149.23 = 149 Impala
−0.13
NON-AREA BASED: SELECTIVE REMOVAL
EXAMPLE cont.: What about N2?

Because its known that 50 ewes and 10 rams (total of 60)
were removed after the first survey, 149 – 60 = N2 = 89
Of the 89 animals, 51% were ewes, therefore a total of 45
ewes and 44 rams remained.
 NON-AREA BASED: EXERCISE
QUESTION 2: Selective removal
The same researcher decided to use selective removal to
estimate how many rabbits were inhabiting Dassen Island.
During the first survey, 100 rabbits were caught. The
proportion of males was 0.6 and the proportion of
females was 0.4. Then, a total of 40 males and 15 females
were removed. A week later, another survey was
undertaken and it was found that there was a proportion
of 0.48 males. Using this data, calculate:
(𝑇𝑥 − 𝑉2 × 𝑇 )
a) N1, the initial population, N 1 = (𝑉2 −𝑉1 )

b) N2, the population estimate at the time of the
second survey and
c)the total of males and females remaining.
PRACTICE THIS EXAMPLE
Finally, the end of sampling methods...

We will start with an Introduction to
Statistics in our next lecture.
Any questions?