Table 10-4

Refer to Table 10-4. Take into account private and external costs and assume the quantity of output is always a whole number (that is, fractional units of output are not possible). The maximum total surplus that can be achieved in this market is

Group of answer choices

$19.

$21.

$24.

$28.

Define:

1. Feminist political economy:

2. Primary care:

3. Women-centred:

4. Gender-accommodating:

5. Housing instability:

1-     Describe anxiety disorder.

2-     Describe obsessive-compulsive disorder.

3-     Describe posttraumatic stress disorder.

4-     Describe schizophrenia.

5-     Describe bipolar disorder.

Note: No prejudice

Define each word:

1. Tax-exempt bond.

2. General obligation bond.

3. Revenue bond.

4. Industrial development bond.

5. Tax anticipation note.

6. Equivalent taxable yield.

x P(x)

0 0.797

1 0.081

2 0.049

3 0.025

4 0.014

5 0.011

6 0.008

7 0.007

8 0.005

9 0.003

Does the given information describe a probability? distribution?

Assuming that a probability distribution is? described, find its mean and standard deviation.

The mean is?

The standard deviation is?

The maximum usual value is?

The minimum usual value is?

Is it unusual for a car to have more than one bumper? sticker? Explain.

A. ?No, because the probability of more than 1 bumper sticker is 0.122?, which is greater than 0.05.

B. ?No, because the probability of having 1 bumper sticker is 0.081?, which is greater than 0.05.

C. ?Yes, because the probabilities for random variable x from 2 to 9 are all less than 0.05.

D. Not enough information is given.

Physical Therapy Center Assignment

1. The operation will receive an interest free, non-amortizing loan of

$ 400,000 from the home office.

2. The pre-opening start up costs are $71,429 which will be

“capitalized” (treated as P,P,& E).

3. The investment in property, plant and equipment (AKA

technology) is $ 285,714 .

Assignment: Prepare the Cash Flow Proforma for 5 years based on

the above assumptions and Proforma Results of Operations posted on

Angel. What is the ending Cash balance?

Solve the given initial-value problem.

y'' + 4y = −1,    y(π/8) =3/4,y'(π/8) = 2

,

Suppose f is defined by f(x)=3x/(4+x^2), −1≤x<3.

What is the domain of f?

Find the intervals where f is positive and where f is negative.

Does f have any horizontal or vertical asymptotes. If so, find them, and show your supporting calculations. If not, briefly explain why not.

Compute f′ and use it to determine the intervals where f is increasing and the intervals where f is decreasing.

Find the coordinates of the local extrema of f

Make a rough sketch of the graph of f using only the information from the previous steps.

y'=y-x^2 ; y(1)= -4

My MATLAB program won't work. I am trying to get the main program to output a plot of the three equations (1 from the main program and two called in the function). The goal is to code a Euler method and a 2nd order Taylor numerical solution for

a. x0= 1.0 , step size h= 0.2, # of steps n=20

b. x0= 1.0 , step size h=0.05 , # of steps n=80 ; write a separate functionn for f(x,y) that is called. Plot the results on the same plot as the exact solution.

I keep getting an error of "Matrix Dimensions must agree ; error in Project_2(my function) with my Tay = ... equation (2nd order taylor equation).

Main Code

t_span = 1:0.2:5;
h=0.2;
y1 = -4;
B=(t_span.^2);
[x,y] = ode45(@(x,y) y-x^2, t_span, y1);
d=[x,y];
project_2(y1,h,d,B)

subplot(4,1,1)
plot(x,y)

xlabel('value of x')
ylabel('value of y(x)')
grid on

t_span = [1:0.05:5];
y1 = -4;
h=0.05;
[x,y]= ode45(@(x,y) y-x^2, t_span, y1);
subplot(4,1,4)
project_2(y1,h,d,B)
plot(x,y)
xlabel('value of x')
ylabel('value of y(x)')
grid on

The Function

function [outputArg,Tay] = project_2(y1,h,d,B)

outputArg = y1 + h*d; %Euler method

Tay= y1 +(h*d)+((1/2)*(h^2))*((y1-2*t_span)+(-B)*d); %2nd order Taylor

subplot(4,1,2)
plot(outputArg)

subplot(4,1,3)
plot(Tay)

end

Consider the following joint distribution.

Based on this distribution, fill in the blanks below.

• E(X)=
• Sd(Y)= .
• Corr(X,Y)=