Deck 11: Further Issues in Using Ols With Time Series Data

A)any collection of random variables in a sequence is taken and shifted ahead by h time periods;the joint probability distribution changes.
B)any collection of random variables in a sequence is taken and shifted ahead by h time periods,the joint probability distribution remains unchanged.
C)there is serial correlation between the error terms of successive time periods and the explanatory variables and the error terms have positive covariance.
D)there is no serial correlation between the error terms of successive time periods and the explanatory variables and the error terms have positive covariance.

A)A model with a lagged dependent variable cannot satisfy the strict exogeneity assumption.
B)Stationarity is critical for OLS to have its standard asymptotic properties.
C)Efficient static models can be estimated for nonstationary time series.
D)In an autoregressive model,the dependent variable in the current time period varies with the error term of previous time periods.

A)Var(u_t|x_t)= √σ.
B)Var(u_t|x_t)= ∞.
C)Var(u_t|x_t)= σ².
D)Var(u_t|x_t)= σ.

A)A random walk process is stationary.
B)The variance of a random walk process increases as a linear function of time.
C)Adding a drift term to a random walk process makes it stationary.
D)The variance of a random walk process with a drift decreases as an exponential function of time.

A)There is no perfect collinearity between the explanatory variables.
B)The explanatory variables are contemporaneously endogenous.
C)The error terms are contemporaneously heteroskedastic.
D)The explanatory variables cannot have temporal ordering.

A)There is scope of adding more lags to the model to better forecast the dependent variable.
B)The problem of serial correlation does not exist in dynamically complete models.
C)All econometric models are dynamically complete.
D)Sequential endogeneity is implied by dynamic completeness..

A)E(r_t1|r_t2)= 0.
B)E(y_t |r_t1,r_t2)= 0.
C)E(u_t |r_t1,r_t2)= 0.
D)E(u_t |r_t1,r_t2)= ∞.

A)E(x_t)is variable,Var(x_t)is variable,and for any t,h ≥ 1,Cov(x_t,x_t+h)depends only on 'h' and not on 't'.
B)E(x_t)is variable,Var(x_t)is variable,and for any t,h ≥ 1,Cov(x_t,x_t+h)depends only on 't' and not on h.
C)E(x_t)is constant,Var(x_t)is constant,and for any t,h ≥ 1,Cov(x_t,x_t+h)depends only on 'h' and not on 't'.
D)E(x_t)is constant,Var(x_t)is constant,and for any t,h ≥ 1,Cov(x_t,x_t+h)depends only on 't' and not on 'h'.

A)E(u_t|x_t,x_t-1,……)= E(u_t)= 0,t = 1,2,….
B)E(u_t|x_t,x_t-1,……)≠ E(u_t)= 0,t = 1,2,….
C)E(u_t|x_t,x_t-1,……)= E(u_t)> 0,t = 1,2,….
D)E(u_t|x_t,x_t-1,……)= E(u_t)= 1,t = 1,2,….

A)Var(u_t|y_{t - 1})> Var(y_t|y_t-1)= σ².
B)Var(u_t|y_{t - 1})= Var(y_t|y_t-1)> σ².
C)Var(u_t|y_{t - 1})< Var(y_t|y_t-1)= σ².
D)Var(u_t|y_{t - 1})= Var(y_t|y_t-1)= σ².

A)moving average process of order one.
B)moving average process of order two.
C)autoregressive process of order one.
D)autoregressive process of order two.

A)AR(2)process.
B)MA(1)process.
C)random walk process.
D)random walk with a drift process.

A)the correlation between the independent variable at time 't' and the dependent variable at time 't + h' goes to ∞ as h → 0.
B)the correlation between the independent variable at time 't' and the dependent variable at time 't + h' goes to 0 as h → ∞.
C)the correlation between the independent variable at time 't' and the independent variable at time 't + h' goes to ∞ as h → 0.
D)the correlation between the independent variable at time 't' and the independent variable at time 't + h' goes to 0 as h → ∞.

A)it is stationary at level
B)averages of such processes already satisfy the standard limit theorems
C)the first difference of the process is weakly dependent
D)it does not have a unit root

A)static model.
B)moving average process of order one.
C)moving average process of order two.
D)autoregressive process of order two.