SHOW WORK: It takes James 45s to walk from x1= -12m to x2= -58m .What is...

Imran consumes two goods, X1 and X2. his utility function takes the form: u(X1, X2)= 4(X1)^3+3(X2)^5....

Imran consumes two goods, X1 and X2. his utility function takes the form: u(X1, X2)= 4(X1)^3+3(X2)^5. The price of X1 is Rs. 2 and the price of X2 is Rs. 4. Imran has allocated Rs. 1000 for the consumption of these two goods. (a) Fine the optimal bundle of these two goods that Imran would consume if he wants to maximize his utility. Note: write bundles in integers instead of decimals. (b) What is Imran's expenditure on X1? On X2?...

Show that the utility functions u(x1, x2)=sqrt(x1) *sqrt(x2) and u(x1, x2) = 0.7 log(x1) + 0.3...

Show that the utility functions u(x1, x2)=sqrt(x1) *sqrt(x2) and u(x1, x2) = 0.7 log(x1) + 0.3 log(x2) represent different preferences. Hint: find two bundles such that a consumer’s prefer- ences are reversed under the above two utility functions.

Suppose {x1,x2,...xn} is linear dependent and {x1,x2} is linear independent. Show that:  2 < than or equal...

Suppose {x1,x2,...xn} is linear dependent and {x1,x2} is linear independent. Show that:  2 < than or equal to (Span(x1,x2,...xn)) < n.

Show that the relation ∼ defined as (x1,y1) ∼ (x2,y2) ⇔ (x1) −(y1)2 = （x2 ）−（y2）2...

Show that the relation ∼ defined as (x1,y1) ∼ (x2,y2) ⇔ (x1) −(y1)2 = （x2 ）−（y2）2 is an equivalence relation on R2. Sketch equivalence classes of (0,1) and (1,1) Find a representative for each distinct equivalence class.

Suppose that X1 and X2 are independent standard normal random variables. Show that Z = X1...

Suppose that X1 and X2 are independent standard normal random variables. Show that Z = X1 + X2 is a normal random variable with mean 0 and variance 2.

(a) Show that the parametric equations x = x1 + (x2 − x1)t,    y = y1 +...

(a) Show that the parametric equations x = x1 + (x2 − x1)t,    y = y1 + (y2 − y1)t where 0 ≤ t ≤ 1, describe (in words) the line segment that joins the points P1(x1, y1) and P2(x2, y2). (b) Find parametric equations to represent the line segment from (−1, 6) to (1, −2). (Enter your answer as a comma-separated list of equations. Let x and y be in terms of t.)

Bundes preferences are given by the utility function u(x1+x2)=x1+x2. Suppose p2=3 and m=24. Show all working...

Bundes preferences are given by the utility function u(x1+x2)=x1+x2. Suppose p2=3 and m=24. Show all working and plot this consumers PCC when p1 drops continuously from 6 to 2.

Suppose James claims it takes him at least 150 minutes to drive to work each day....

Suppose James claims it takes him at least 150 minutes to drive to work each day. You pick a random sample of 10days and observe an average of 136 minutes. The standard deviation from the sample was 28 minutes. You plan to use the sample results to test James’ claim. Assume a normal distribution. Set up an appropriate hypothesis test with a significance level of 5%. a) Should James’ claim be rejected? b) if the sample size was 50 instead...

Show that utility u(x1,x2)=2√x1+√x2 is strictly quasi concave(Hint: You can prove it by showing the utility...

Show that utility u(x1,x2)=2√x1+√x2 is strictly quasi concave(Hint: You can prove it by showing the utility function has diminishing marginal rate of substitution).

There are two traffic lights on a commuter's route to and from work. Let X1 be...

There are two traffic lights on a commuter's route to and from work. Let X1 be the number of lights at which the commuter must stop on his way to work, and X2 be the number of lights at which he must stop when returning from work. Suppose that these two variables are independent, each with the pmf given in the accompanying table (so X1, X2 is a random sample of size n = 2). x1 0 1 2 μ...