Evaluate the processes of excretion through kidneys and sweat glands by which an animal removes waste from its body

IN C++

Write a program that reads in int values from the user until they enter a negative number like -1. Once the user has finished entering numbers, print out the highest value they’ve entered, the lowest value they’ve
entered, and the total number of numbers they’ve entered. The negative number they entered should not be taken as one of the values entered.

Use an energy-level diagram to show the electron arrangement in the scandium (Sc) atom. The atomic number of Sc is 21. Write an allowed set of quantum numbers ( ) for the highest energy electron.

Write the following methods in a Java project:

1. a) A Java method to determine and return the sum of first three numbers, where three numbers are received as parameters.

2. b) A Java method to determine and return the highest of N integers. The number of integers is received as a parameter. The method should prompt the user to enter the N numbers, then it return the highest.

3. c) A Java method to determine and return an appropriate value indicating if a number K is even, where K is received as a parameter.

4. d) A Java method to determine and return an appropriate value indicating if a word is present in a file, where the filename and word is received as parameters.

5. e) Test the above methods from the main method.

1. A package contains three candies. Of interest is the number of caramel flavored candies in the package. Based on past experience the probability of 0 caramel candies is 0.11, the probability of 1 caramel candy is 0.22, and the probability of 2 caramel candies is 0.36. Let X be the number of caramel candies in the package.

   Find the probability that X = 3.

1. A package contains three candies. Of interest is the number of caramel flavored candies in the package. Based on past experience the probability of 0 caramel candies is 0.11, the probability of 1 caramel candy is 0.22, and the probability of 2 caramel candies is 0.41. Let X be the number of caramel candies in the package.

   Find the probability that X is at most 2?

1. A package contains three candies. Of interest is the number of caramel flavored candies in the package. Based on past experience the probability of 0 caramel candies is 0.11, the probability of 1 caramel candy is 0.22, and the probability of 2 caramel candies is 0.41. Let X be the number of caramel candies in the package.

   What is the expected value of X?

2. A package contains three candies. Of interest is the number of caramel flavored candies in the package. Based on past experience the probability of 0 caramel candies is 0.11, the probability of 1 caramel candy is 0.22, and the probability of 2 caramel candies is 0.34. Let X be the number of caramel candies in the package.

   What is the standard deviation of X?

3. A package contains three candies. Of interest is the number of caramel flavored candies in the package. Based on past experience the probability of 0 caramel candies is 0.11, the probability of 1 caramel candy is 0.22, and the probability of 2 caramel candies is 0.37. Let X be the number of caramel candies in the package.

   Suppose that two random independent packages are selected. What is the probability that there a total of 6 caramel candies?

4. The quality assurance engineer of televisions inspects TV’s from a large factory. She randomly selects a sample of 18 TV’s from the factory to inspect. Assume that 33% of the TV’s in the lot are silver. Let Y be the number of silver TV’s selected.

   Find the probability that at least 6 of the TV’s selected are silver.

1. The quality assurance engineer of televisions inspects TV’s from a large factory. She randomly selects a sample of 18 TV’s from the factory to inspect. Assume that 37% of the TV’s in the lot are silver. Let Y be the number of silver TV’s selected.

   Find the probability that less than 4 of the TV’s selected are silver.

1. The quality assurance engineer of televisions inspects TV’s from a large factory. She randomly selects a sample of 18 TV’s from the factory to inspect. Assume that 31% of the TV’s in the lot are silver. Let Y be the number of silver TV’s selected.

   Find the probability that between 3.5 and 7.5 of the TV’s selected are silver.

1. The quality assurance engineer of televisions inspects TV’s from a large factory. She randomly selects a sample of 18 TV’s from the factory to inspect. Assume that 33% of the TV’s in the lot are silver. Let Y be the number of silver TV’s selected.

   Find the mean of Y.

2. The quality assurance engineer of televisions inspects TV’s from a large factory. She randomly selects a sample of 18 TV’s from the factory to inspect. Assume that 35% of the TV’s in the lot are silver. Let Y be the number of silver TV’s selected.

   Find the standard deviation of Y.

In this project we will implement the Minesweeper game. Minesweeper is played on a rectangle grid. When the game starts, a number of bombs are hidden on random positions on the field. In every round, the player "touches" a cell of the field. If the cell contains a bomb, it explodes, the game ends, and the player loses. Otherwise, the cell is uncovered to show the number of bombs in the vicinity, that is, the number of neighboring cells that contain bombs. (Each cell has eight neighbors, including the diagonal neighbors. If the number is zero, the cell is displayed as a blank.) When the user believes she knows the position of a bomb, she can flag that cell with a marker. It is allowed to change one's mind later and uncover a flagged cell. If all cells are either uncovered or flagged, and the number of flags is equal to the number of bombs, then the game ends and the player wins.

The display should be performed in the Terminal. The C code must enforce the rules and prevent the players to choose forbidden options.

Do c programming coding based on this qusetion..

Suppose that the US produces two goods, X and Y, with capital and labor. The US is relatively abundant in capital, and X is relatively capital-intensive. In the short-run, neither capital nor labor can move between the X and Y industries. In the medium-run, labor is mobile but capital is specific to each industry. In the long run, both capital and labor are mobile. If the US decides to withdraw from its free trade agreements and impose much higher tariffs, what happens to real incomes in the U.S.? Who wins and who loses in the short run? Who wins and who loses in the medium run? Who wins and who loses in the long run?

Consider the following experiment: we roll a fair die twice. The two rolls are independent events. Let’s call M the number of dots in the first roll and N the number of dots in the second roll.

(a) What is the probability that both M and N are even?

(b) What is the probability that M + N is even?

(c) What is the probability that M + N = 5?

(d) We know that M + N = 5. What is the probability that M is an odd number?

(e) We know that M is an odd number. What is the probability that M + N = 5?

The National Football League (NFL) records a variety of performance data for individuals and teams. To investigate the importance of passing on the percentage of games won by a team, the following data show the average number of passing yards per attempt (Yards/Attempt) and the percentage of games won (WinPct) for a random sample of 10 NFL teams for the 2011 season.†

A) For the 2011 season, suppose the average number of passing yards per attempt for a certain NFL team was 6.4. Use the estimated regression equation developed in part (c) to predict the percentage of games won by that NFL team. (Note: For the 2011 season, suppose this NFL team's record was 8 wins and 8 losses. Round your answer to the nearest integer.)

B) For the 2011 season, suppose the average number of passing yards per attempt for a certain NFL team was 6.4. Use the estimated regression equation developed in part (c) to predict the percentage of games won by that NFL team. (Note: For the 2011 season, suppose this NFL team's record was 8 wins and 8 losses. Round your answer to the nearest integer.)