End-of-year Examinations, 2020 STAT317/STAT456 ECON323/614 – 20S2 (C)
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No electronic/communication devices are permitted.
Students may take exam question paper away after the exam.
Mathematics and Statistics
EXAMINATION
End-of-year Examinations, 2020
STAT317 / ECON323 -20S2 (C) Time Series Methods
STAT 456 / ECON614-20S2 (C) Time Series and Stochastic Processes
Examination Duration: 120 minutes
Exam Conditions:
Restricted Book exam: Approved materials only.
Calculators with a ‘UC’ sticker approved.
Materials Permitted in the Exam Venue:
Restricted Book exam materials.
Students may bring in one A4, double sided, handwritten page of notes.
Materials to be Supplied to Students:
1 x Standard 16-page UC answer book.
Instructions to Students:
Use black or blue ink only (not pencil).
Students in STAT456 and ECON614 have to work on ALL 6 questions.
Students in STAT317 and ECON323 have to CHOOSE 5 out of 6 questions.
Show ALL working.
If you use additional paper this must be tied within the exam booklet. Remember to write your name and student
number on it.
End-of-year Examinations, 2020 STAT317/STAT456 ECON323/614 – 20S2 (C)
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Questions Start on Page 3
End-of-year Examinations, 2020 STAT317/456 ECON323/614-20S2 (C)
Note
Students in STAT456 and ECON614 have to work on ALL 6 questions.
Students in STAT317 and ECON323 have to CHOOSE 5 out of 6 questions. Only 5
questions will be marked.
Each question is worth 20 marks.
Q.1 Time series decomposition [20 marks]
(a) Name and briefly discuss the three time series components that a time series
is typically decomposed into. [4 marks]
(b) Why are these components termed unobserved components? [4 marks]
(c) You have the time series of monthly spending by New Zealanders at retail stores
in the past twenty years. For each of the three unobserved components give an
example of consumer spending behaviour or changes in the New Zealand retail
environment that primarily affect that component’s month-to-month change.
[4 marks]
(d) The relationship between the measured value and its three components can
be written either as an additive model or a multiplicative model. Write down
examples of the 2 equations. Also sketch a plot of the two types of series.
[4 marks]
(e) Can a periodogram be used in identifying the existence of any of the unobserved
components? [4 marks]
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End-of-year Examinations, 2020 STAT317/456 ECON323/614-20S2 (C)
Q.2 Basic Concepts [20 marks]
(a) You have been asked by a client to develop a system to forecast a number of
their time series. In less than one page outline the questions you might ask the
client before you start developing your time series models. Explain why you
asked each question. [5 marks]
(b) Discuss briefly why you should plot a time series before analysing it. [4 marks]
(c) Describe the meaning of the following terms as they apply to time series
[4 marks]
i. Stochastic process
ii. Stationarity
iii. Data generating process
(d) What would you expect the residuals or errors from your time series model to
be like? [3 marks]
(e) Sketch what the time series plot of the residuals would be like if you had a
level shift (i.e. an abrupt change in the mean level) in the original time series
if you fitted a time series model ignoring the level shift? [4 marks]
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End-of-year Examinations, 2020 STAT317/456 ECON323/614-20S2 (C)
Q.3 Autocovariance and Autocorrelation [20 marks]
(a) For each of the four series [5 marks]
choose which of the following four ACF graphs is from that series
Clearly explain for Series 2 why you chose that ACF graph.
(b) Describe what each of the terms in the exponential smoothing model represents.
[3 marks]
ŷt+1 = αyt + (1− α)ŷt
(c) What is the range of values that α can take? [3 marks]
(d) In what respect is the model different when α is at its minimum value? And
when α is at its maximum? [3 marks]
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End-of-year Examinations, 2020 STAT317/456 ECON323/614-20S2 (C)
(e) Assume we have observations y1, y2, . . . , yn of a stationary time series. Write
out the formula used to calculate the estimator for the autocovariance from
the sample.
If your formula involves other estimators, then also explain these. It must be
clear in the end how the estimator of the autocovariance function is computed
from the sample. [4 marks]
(f) Assume the value of the autocovariance function, γ(h), is 0.07. What is the
value of γ(−h). [2 marks]
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End-of-year Examinations, 2020 STAT317/456 ECON323/614-20S2 (C)
Q.4 Periodogram [20 marks]
(a) A monthly time series Xt for t = 1, . . . , n is simulated from the following model:
Xt = 7 sin
(
2πt
24
+
π
3
)
+Wt
where Wt ∼ WN(0, σ2W ). What are the following quantities:
i. frequency; [2 marks]
ii. period of the cycle; [2 marks]
iii. amplitude; [2 marks]
iv. phase in radians; and [2 marks]
v. phase in time units. [3 marks]
(b) Consider the following periodogram. Identify the frequencies and the periods
of possible cycles in the underlying time series. [4 marks]
(c) The Nyquist frequency is the highest frequency represented in the periodogram.
i. What is the Nyquist frequency for equidistant observations x1, x2, . . . , xn?
[2 marks]
ii. How does a cosine wave behave at the Nyquist frequency? [3 marks]
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End-of-year Examinations, 2020 STAT317/456 ECON323/614-20S2 (C)
Q.5 Wold Decomposition [20 marks]
(a) Which kind of time series have a Wold decomposition? [2 marks]
(b) Explain the Wold decomposition for a time series Xt. Provide the formula as
part of your explanation. [3 marks]
(c) Which condition holds for the coefficients of the Wold decomposition? [3 marks]
(d) Explain the relationship between the Wold decomposition and ARMA models.
[6 marks]
(e) Show how a mean zero AR(1) Xt = φ1Xt−1 + Wt process can be seen as an
infinite MA(∞) process. Which condition on φ1 must hold? [6 marks]
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End-of-year Examinations, 2020 STAT317/456 ECON323/614-20S2 (C)
Q.6 Model Selection [20 marks]
(a) Explain the key features of the dependence observed in the following plot of a
times series. [5 marks]
Time, t
X
t
0 100 200 300 400 500
−
4
−
2
0
2
4
(b) Explain how the features mentioned in part (a) are shown in the sample auto-
correlation and partial autocorrelation functions below. [4 marks]
0 5 10 15 20
−
0
.5
0
.0
0
.5
1
.0
Lag
A
C
F
Autocorrelation
5 10 15 20
−
0
.8
−
0
.6
−
0
.4
−
0
.2
0
.0
0
.2
0
.4
Lag
P
a
rt
ia
l A
C
F
Partial Autocorrelation
(c) Use these plots to identify whether a suitable model could be an AR(p), MA(q)
or mixed ARMA(p, q). Explain your choice and suggest the order of the model.
[4 marks]
(d) Write down the backshift (or characteristic) polynomials for the ARMA(p, q)
model:
Xt − φ1Xt−1 − · · · − φpXt−p = Wt + θ1Wt−1 + · · ·+ θqWt−q
[2 marks]
(e) What are the conditions for invertibility and stationarity for an ARMA pro-
cess? [3 marks]
(f) What condition is needed to avoid parameter redundancy for an ARMA pro-
cess.
[2 marks]
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