Parent Corporation purchased land from S1 Corporation for $220,000 on December 26, 20X8. This purchase followed a series of transactions between P-controlled subsidiaries. On February 15, 20X8, S3 Corporation purchased the land from a nonaffiliate for $160,000. It sold the land to S2 Company for $145,000 on October 19, 20X8, and S2 sold the land to S1 for $197,000 on November 27, 20X8. Parent has control of the following companies: Subsidiary Level of Ownership 2008 Net Income S3 80% $100,000 S2 70% $70,000 S1 90% $95,000 Parent reported income from its separate operations of $200,000 for 20X8. Based on the preceding information, what should be the amount of income assigned to the controlling shareholders in the consolidated income statement for 20X8? A. $369,400 B. $405,000 C. $465,000 D. $60,000

2. Data was collected where a weightlifter was asked to do as many repetitions as possible using different amounts of weight. Below is a table that shows how much weight was on the bar, and how many repetitions the weightlifter could do: Weight 200 300 400 500 Reps 42 27 12 3

a. Calculate the correlation for this data. What does this value tell you about the relationship between these two variables?

b. Determine the least squares regression line for this data. Interpret the values for the y-intercept and the slope within this scenario.

c. Calculate r2 for this data and describe what it represents.

d. Using the regression line from part (b), calculate the predicted number of repetitions for this weight lifter if the weight is 400 pounds, and then calculate and interpret the residual for that weight using the data.

• Given the following data where city MPG is the response variable and weight is the explanatory variable, explain why a regression line would be appropriate to analyze the relationship between these variables:

• Construct the regression line for this data.
• Interpret the meaning of the y-intercept and the slope within this scenario.
• What would you predict the city MPG to be for a car that weighs 3000 pounds?
• If a car that weighs 3000 pounds actually gets 32 MPG, would this be unusual? Calculate the residual and talk about what that value represents

Between 4:00PM and 6:00PM the vehicles arrive to the entrance ramp of a regional toll road at a constant rate of 1740 vehicles per hour. The toll plaza at the entrance ramp has five toll booths, which combined can process up to 34 vehicles per minute. At 4:30PM one of the toll booths is disabled due to electronics malfunction, which reduces the vehicle processing capacity of the toll plaza to 27 vehicles per minute. At 5:00 PM the toll booth is repaired and the toll plaza capacity is restored back to 34 vehicles per minute. Assuming that the vehicle arrivals and departures at the toll plaza have uniform deterministic distributions, determine the total duration of the queue that had formed due to the toll booth closure, in minutes.

In Python:

Write a function called sum_odd that takes two parameters, then calculates and returns the sum of the odd numbers between the two given integers. The sum should include the two given integers if they are odd. You can assume the arguments will always be positive integers, and the first smaller than or equal to the second.

To get full credit on this problem, you must define at least 1 function, use at least 1 loop, and use at least 1 decision structure.

Examples:

sum_odd(0, 5) should return the value 9 as (1 + 3 + 5) = 9

sum_odd(6, 10) should return the value 16

sum_odd(13, 20) should return the value 64

sum_odd(7, 11) should return the value 27

A TV provider has 300,000 customers and is considering unlimited movie streaming services. A random sample of 256 customers is asked what they would be willing to pay per month for the unlimited movie streaming services. the same average of the responses is $15 and the standard deviation is $16.

1. Consider all 300,000 customers. What is the average price that they would be willing to pay for unlimited movie streaming? What is the associated standard error (in $)?

2. What is the 90% confidence interval for the average of what all the customers (300,000) would pay?

3. Will the histogram of the prices given by customers in the sample be a good fit for the normal curve? What about the histogram of the prices if the TV provider company asked all 300,000 customers? What about the probability histogram of the sample average price?

Booked Solid, a small independent bookstore in Bradford is trying to decide whether to discontinue selling magazines. The owner suspects that only 7% of the customers buy a magazine and thinks that she might be able to use the display space to sell something more profitable. Before making a final decision, she decides that for one day he'll keep track of the number of customers and whether or not they buy a magazine.

1. What is the probability that exactly 5 of the first 15 customers buy magazines? Round your answer to 4 decimal places.
2. 
   What is the probability that at least 5 of her first 50 customers buy magazines? (10 points)
   3. She had 280 customers that day. Assuming this day was typical for her store, what would be the mean and standard deviation of the number of customers who buy magazines each day? (10 points)
   4. Surprised by the high number of customers who purchased magazines that day, the owner decided that her percentage estimate of customers who still buy magazines must have been too low. How many magazine sales would it have taken to convince you? Justify your answer.

1. National Bank (see previous problem: pasted down below) is considering adding a second teller to the lunch-time situation to alleviate congestion. If the second teller is added, find the following:
   1. The average teller utilization
   2. The probability that there are 0 customers in the system
   3. The average number of customers in line
   4. The average time a customer waits before it seeing the teller
   5. The average time a customer spends in the service system
   6. If the tellers are paid $15/hour, is it worth adding the second teller (Hint: answer the question by only looking at the single hour by comparing 1 vs. 2 people)

To help answer the question, here is the "previous problem":

1. National Bank currently employs a single teller to assist customers over their lunch breaks. The typical arrival rate of customers is 11 people per hour where the teller can service people at a rate of 12 customers per hour. Assuming the standard assumptions of queuing models are met, find the following:
   1. The utilization of the teller
   2. The probability that there are 0 customers in the system, 8 customers in the system.
   3. The average number of customers in line
   4. The average time a customer waits before it seeing the teller
   5. The average time a customer spends in the service system

simulate the reception of a bank in C++ .

You will have customers requesting transactions (open account, deposit money, close account, withdraw money). You are required to simulate per the following parameters and rules: Customers coming at random times Each customer will require random amount of service time You may have 1-3 tellers based on the # of customers Once you have more than 4 customers waiting you need to get the 2nd teller Once you have more than 8 customers waiting you need to get the 3rd teller Once the line size gets smaller, you should remove the tellers in opposite order of their addition (the last one joining should be the first one leaving) The reception operates from 10:00 AM until 1:00 PM At the end of the day, you need to run the following reports: A list of customers coming along with the type of transactions they requested. This report should be sorted by: Last name of the customer Amount of money involved Time of arrival Average waiting time per customers Average number of customers waiting

Firms A and B are in a market of fixed size (Size = 1), developing a product for their customers. The more R and D they undertake i.e. the more time they spend, the better product they are able to launch in the market. However, the firms are facing a constraint; whoever launches their product first, will gain a market share of customers that cannot be transferred to their opponent. In this case the opponent will obtain the remainder of the customers in the market. If both A and B launch their product at the same time, the share of customers will be equally divided amongst them. Each firm has to choose time t at which they will launch their product in the market. The share of customers in the market is defined by the function f(t)=t where f(0)=0 and f(1)=1 (The share of customers in the market is a function that increases over time with the lowest share being 0 and the maximum share of customers equal to 1). Assume time and hence market share of customers is perfectly divisible over the spectrum of time defined as t = {0..............1}. Hint: This means that any fractional amount of time and hence market share is possible 1/3,1/4, 1/6 etc,

Kindly post the steps in detail