Exercises

You are given:

The random walk model
[[math]]y_t = y_0 + c_1 + c_2 + \cdots c_t[[/math]]

[math]c_t, t = 0,1,2,\cdots, T [/math]

The following nine observed values of [math]c_t[/math]:

t [math]c_t[/math]

11 2

12 3

13 5

14 3

15 4

16 2

17 4

18 1

19 2
The average value of [math]c_1, c_2 , \ldots , c_{10}[/math] is 2.
The 9 step ahead forecast of [math]y_{19}[/math] , [math]\hat{y}_{19}[/math] , is estimated based on the observed value of [math]y_{10}[/math] .

Calculate the forecast error, [math]y_{19} - \hat{y}_{19}[/math].

1
2
3
8
18

Created by Admin, May 25'23

You are given:

The random walk model
[[math]]y_t = y_0 + c_1 + c_2 + \cdots c_t[[/math]]

[math]c_t, t = 0,1,2,\cdots, T [/math]

The following nine observed values of [math]c_t[/math]:

t y_t

1 2

2 5

3 10

4 13

5 18

6 20

7 24

8 25

9 27

10 30
[math]y_0 = 0 [/math]
The 9 step ahead forecast of [math]y_{19}[/math] , [math]\hat{y}_{19}[/math] , is estimated based on the observed value of [math]y_{10}[/math] .

Calculate the standard error of the 9 step-ahead forecast, [math]\hat{y}_{19}[/math] .

4/3
4
9
12
16

Created by Admin, May 25'23

A random walk is expressed as

[[math]] y_t = y_{t-1} + c_t, \, t = 1,2, \ldots [[/math]]

where

[[math]] \operatorname{E}(c_t) = \mu_c, \, \operatorname{Var}(c_t) = \sigma_c^2, \, t=1,2,\ldots [[/math]]

Determine which statements is/are true with respect to a random walk model.

If [math]µ_c \neq 0[/math], then the random walk is nonstationary in the mean.
If [math] \sigma_c^2 = 0[/math], then the random walk is nonstationary in the variance.
If [math]\sigma_c^2 \gt 0[/math], then the random walk is nonstationary in the variance.

None
I and II only
I and III only
II and III only
The correct answer is not given by (A), (B), (C), or (D).

Created by Admin, May 25'23

Determine which of the following indicates that a nonstationary time series can be represented as a random walk

A control chart of the series detects a linear trend in time and increasing variability.
The differenced series follows a white noise model.
The standard deviation of the original series is greater than the standard deviation of the differenced series.

I only
II only
III only
I, II and III
The correct answer is not given by (A), (B), (C), or (D).

Created by Admin, May 25'23

You are given two models. Model L:

[[math]] y_t = \beta_0 + \beta_1t + \epsilon_t [[/math]]

where [math]\{\epsilon_t\}[/math] is a white noise process, for [math]t=0,1,2,\ldots [/math]. Model M:

[[math]] \begin{aligned} y_t &= y_0 + \mu_ct + \mu_t\\ c_t &= y_t - y_{t-1}\\ u_t &= \sum_{j=1}^t \epsilon_j \end{aligned} [[/math]]

where [math]\{\epsilon_t\}[/math] is a white noise process, for [math]t=0,1,2,\ldots [/math].

Determine which of the following statements is/are true.

Model L is a linear trend in time model where the error component is not a random walk.
Model M is a random walk model where the error component of the model is also a random walk.
The comparison between Model L and Model M is not clear when the parameter [math]\mu_c = 0.[/math]

I only
II only
III only
I, II and III
The correct answer is not given by (A), (B), (C), or (D).

Created by Admin, May 25'23

You are given the following eight observations from a time series that follows a random walk model:

Time (t)	0	1	2	3	4	5	6	7
Observation ( [math]y_t[/math] )	3	5	7	8	12	15	21	22

You plan to fit this model to the first five observations and then evaluate it against the last three observations using one-step forecast residuals. The estimated mean of the white noise process is 2.25.

Let F be the mean error (ME) of the three predicted observations.

Let G be the mean square error (MSE) of the three predicted observations.

Calculate the absolute difference between F and G, | F − G | .

3.48
4.31
5.54
6.47
7.63

Created by Admin, May 25'23

t	[math]c_t[/math]
11	2
12	3
13	5
14	3
15	4
16	2
17	4
18	1
19	2