A) Determine the acceleration of a 25.0 kg mass down a frictionless incline plane (angle of incline=30 degrees)

B) Repeat the above problem for an incline with a coefficient of friction of 0.15.

Draw orbital diagrams for atoms with the following electron configurations:

1. 1s²2s²2p⁶3s²3p⁶4s²3d⁷

12. Define the following terms and principles: (8 points)
    1. Heisenberg uncertainty principle
       
    2. Aufbau principle
       
    3. Pauli exclusion principle
       
    4. Hund’s rule

labeling of bone formation

Which of the following is not one of the considerations given to capital budgeting proposals?

Select one:

A. Whether there is an immediate need to replace or repair critical assets

B. Whether the proposal is in compliance with capital budgeting policies

C. Whether the proposal would meet the established minimum return on capital

D. Whether the proposal is congruent with the firm's long-term goals

E. All of the above are considerations given to capital budgeting proposals

Which of the following affect the weighted average cost of capital?

Select one:

A. Interest on bank loans

B. Dividends expected by investors

C. Expected increases in the value of stock in the company

D. Bond interest payments

E. All of the above

The present value of an ordinary annuity is:

Select one:

A. The amount that would be paid today in order to receive a series of unequal payments in the future

B. The amount that would be paid today in order to receive a series of equal payments in the future

C. The amount that would be paid in the future in order to receive a series of unequal payments leading up to that point

D. The amount that would be paid in the future in order to receive a series of equal payments leading up to that point

E. None of the above

The present value of a single sum is:

Select one:

A. The amount that would be paid today to receive a single amount at a specified date in the future

B. The amount that would be paid today to receive a single amount at an unspecified date in the future

C. The amount that would be paid at a specified date in the future to receive a single amount today

D. The amount that would be paid at an unspecified date in the future to receive a single amount today

E. None of the above

Consider a casino game that an individual (Joe) wants to play. It costs him N dollars each time to play. He loves this game and wants to continue playing until he is either broke or he breaks the bank (wins all the money). The probability of winning is p; the probability of losing is q. These are fixed probability values every time the game is played.

Joe brought $M to the casino. Every time one plays you either lose the entrance fee ($N) or you win and are paid back D dollars.

(a) How much money does Joe expect to have after playing n times? Derive a formula for how much money he has.

(b) Suppose Joe starts with $100, p=0.3, q=0.7, N=$5, and D=$20. Is it likely that Joe will break the bank?

(c) If the answer to (b) is no, how many times is it likely that Joe can play this game before he is broke?

Bergamo Bay's computer system generated the following trial balance on December 31, 2019. The company’s manager knows something is wrong with the trial balance because it does not show any balance for Work in Process Inventory but does show a balance for the Factory Overhead account. In addition, the accrued factory payroll (Factory Wages Payable) has not been recorded.

After examining various files, the manager identifies the following six source documents that need to be processed to bring the accounting records up to date.

Jobs 402 and 404 are the only units in process at year-end. The predetermined overhead rate is 100% of direct labor cost.

3. Prepare a revised trial balance.

Could i get a walk trough how to solve these questions. Note that   is where the answer is meant to go.

Question 1

Say, instead of a separate variable (nItems), the number of items currently in the list are stored at index 0 in the array data, the actual values being stored starting at index 1. Complete the constructor that instantiates a list that can hold n values (excluding the item that holds the number of items currently in the list). That is, one should be able to add n values to the list before the need to grow it.

public class PackedArrayList {
public int[] data;

public PackedArrayList(int n) {
data = new int[  ];
data[0] =  ;
}
}

Question 2

Complete the body of method addEnsureCapacity in the following code:
public class MyArrayList {
public int[] data;
public int nItems;
public MyArrayList(int n) {
data = new int[n];
nItems = 0;
}
public void grow() {
//assume it increases capacity by 10
}
public boolean isFull() {
return (nItems == data.length);
}
public void addBasic(int val) {
data[nItems] = val;
nItems++;
}
public void addEnsureCapacity(int val) {
if(  == false) {
 ;
}
else {
 ;
addBasic(val);
}
}
}

Assume a file containing a series of words is named words.txt and exists on the computer’s disk. Write a program that reads the data and counts the number of occurrences of each letter. The program should then displays how many times each letter appears in the sentence.

1. About time intervals statistics,

   1. (a) A municipal bus system, when operating perfectly on schedule, provides a bus at any given bus stop every 30 min. You arrive at a random time at a bus stop. What is the average waiting time until the next bus arrives?

   2. (b) The busses become totally disorganized so that the spacing between busses is made random (assume that their arrival is a Poisson random process.) The same number of busses are still in operation. You again arrive at a bus stop at an arbitrary time. What is the average waiting time under these circumstances?

One method for producing hydrogen is to react coke (mostly solid carbon) with steam to make syngas, a mixture of CO and hydrogen

C(s) + H₂O(g) ⇌ CO(g) + H₂(g)     K_p = 0.45 at 900 K     ΔH = +131 kJ

What is the partial pressure of CO at equilibrium when 9.59 atm of H₂O(g) is heated with excess C(s) at 900 K?

After equilibrium is reached, CO(g) is added.

In which direction will the reaction shift?

Will the equilibrium constant, K, increase or decrease?

1. Company Z is evaluating a project that will increase annual sales by $150,000 and annual cash costs by $115,000. The project will initially require $98,000 in fixed assets that will be depreciated straight-line to a zero book value over the 4-year life of the project. The applicable tax rate is 32 percent. What is the NPV of this project if the required rate of return is 7% and the fixed assets required for the project will be scrapped at the end of the project?

Consider the following hypothetical natural experiment. The United States imposes a 25% tariff on imported automobiles (cars) in 2020 but does not do so on imported trucks. Canada does not impose such a tariff. In 2020 vehicles (cars+light trucks) in the U. S. (noncommercial) averaged 30 mpg while vehicles in Canada averaged 35 mpg. In 2025 vehicles in the US averaged 35 mpg while vehicles in Canada averaged 45 miles per gallon. Assume (this is a hypothetical natural experiment) that there are no differences between drivers and economic conditions in Canada and the U.S. In an actual analysis of such a situation any observable differences would be addressed using some matching algorithm. a. Using the difference in difference estimator calculate the yearly impact of the tariff on fuel efficiency for all vehicles. b. Assuming that there were 10 million vehicle (car and light truck) sales in the U.S. in 2025 and that each vehicle drives on average 10,000 miles per year, how much more gasoline would be consumed by U. S. drivers in 2025 due to the tariff?

Review 19 In the discussion of TCP splitting in the sidebar in section 3.7  it was claimed that the response time with TCP splittting is approximately 4 *  RTTFE +RTTBE + processing time. Please Justify this claim                                                                                                                 

Jim Kurose and Keith Ross,”Computer Networking – A Top-Down Approach”, Addison-Wesley, Seventh Edition, 2017. ISBN-13: 978-0-13-359414-0

Gru's schemes have a/an 7% chance of succeeding. An agent of the Anti-Villain League obtains access to a simple random sample of 1100 of Gru's upcoming schemes.
Find the probability that...
(Answers should be to four places after the decimal, using chart method, do NOT use the continuity correction):

...less than 101 schemes will succeed:

...more than 95 schemes will succeed:

...between 95 and 101 schemes will succeed:

...less than 8.5% of schemes will succeed:

...more than 9.5% of schemes will succeed:

...between 8.5% and 9.5% of schemes will succeed:

It is believed that the design of appurtenances in the stilling basin can reduce the basin length by 70- 80%. Give comments on this statement. This question is open-ended. Therefore it must be supported by relevant literature.