List of top Statistics, Econometrics & Mathematical Economics Questions

The estimated results of a Probit model is given in the table below, where Y is a binary variable taking the value either 0 or 1, and X is an integer. The probability that Y = 1 when X = 30 is ________ (rounded off to two decimal places).
VariableCoefficientStandard ErrorZ-StatisticProbability
Constant-0.0640.399-0.1610.871
X0.0290.0102.9160.003
Let x and y be two dummy variables that take the values of either 0 or 1, and follow the bivariate frequency distribution as given below. If a logit regression is estimated with y as the dependent variable and x as the independent variable, then the estimated coefficient of x is _____ (rounded off to two decimal places)
x01Total
y
061117
16713
Total121830
The following table provides different statistical model specifications along with the elasticity of yt with respect to xt. Which one of the following options is correct ?
RowStatistical ModelElasticity
1\(y_t=β_1+β_2\frac{1}{x_t}\epsilon_t\)\(-\frac{β_2}{x^2_t}\)
2\(y_t=β_1-β_2\text{ln}(x_t)+\epsilon_t\)\(-\frac{β_2}{x^2_t}\)
3ln(yt) = β1 + β2 ln(xt) + εtβ2
4ln(yt) = β1 + β2xt + εtβ2xt
5ln(yt) = β1 + β2 ln(xt) + εtβ2 exp(xt)
6ln(yt) = β1 + β2xt + εt\(β_2\frac{1}{\text{exp}(x_t)}\)
For the function \(F: \R^2 → \R\) specified as F(x, y) = x3 - y3 + 9xy, which of the following options is/are correct
Two friends Aditi and Raju are deciding independently whether to watch a movie or go to a music concert that evening. Both friends would prefer to spend the evening together than apart. Aditi would prefer that they watch a movie together, while Raju would prefer that they go to the concert together. The payoff matrix arising from their actions is presented below. p and (1 - p) are the probabilities that Aditi will decide in favour of the movie and concert, respectively. Similarly, q and (1 - q) are the probabilities that Raju will decide in favour of the movie and concert, respectively. Which one of the following options correctly contains all the Nash Equilibria ?
Raju
Aditi MovieConcert
Movie2,10,0
Concert0,01,2
If X and Y are two random variables with the joint probability density function
\(f(x,y)=\left\{ \begin{array}{l} \frac{2}{3}(x+2y);\ \text{for}\ 0\lt x, y\lt 1 \\ 0;\ \ \ \ \ \ \ \ \ \ \text{otherwise} \end{array} \right.\)
then \(E[X|Y=\frac{1}{2}]\) will be
If a discrete random variable X follows the uniform distribution and assumes only the values 8, 9, 11, 15, 18, and 20, then P(|X -14| < 5) is
Assume the following probabilities for two events, A and B: P(A) = 0.50,P(B) = 0.50, and P(A ∪ B) = 0.85. Then we can conclude that
For the following function f(x) to be a probability density function, the value of c will be ____________ (rounded off to two decimal places).
\(f(x)=\left\{ \begin{array}{l}\frac{c}{\sqrt{x}};0\lt x\lt 4\ \text{and}\ c\gt0 \\ 0;\ \ \text{otherwise} \end{array} \right.\)
A six-face fair die is rolled once, with X being the number that appeared on the uppermost surface. Then the variance of X is ________ (rounded off to three decimal places).
Consider a simple pooled regression model: yit = β0 + β1xit + vit where vit = μi + ∈it and Cov(xit, μi) ≠ 0. Here, μi captures the unknown individual specific effects and it is the idiosyncratic error uncorrelated with both xit and μi. If the parameters of this model are estimated using the ordinary least squares (OLS) method, then the estimated slope coefficient will be
Let x1, x2 ….. xn be an independently, and identically distributed (iid) random sample drawn from a population that follows the Normal Distribution N(μ, σ2), where both the mean (μ) and variance (σ2) are unknown. Let \(\bar{x}\) be the sample mean. The maximum likelihood estimator (MLE) of the variance (\(\hat{\sigma}^2_{MLE}\)) is/are then characterized by