Question

There are three nursing positions to be filled at Lilly Hospital. Position 1 is the day...

There are three nursing positions to be filled at Lilly Hospital. Position 1 is the day nursing supervisor; position 2 is the night nursing supervisor; and position 3 is the nursing coordinator position. There are 11 candidates qualified for all three of the positions. Determine the number of different ways the positions can be filled by these applicants.

Homework Answers

Answer #1

Answer:

Given that:

There are three nursing positions to be filled at Lilly Hospital. Position 1 is the day nursing supervisor; position 2 is the night nursing supervisor; and position 3 is the nursing coordinator position. There are 11 candidates qualified for all three of the positions.

Here ​​​​​​

The number of different ways the positions can be filled by these applicants is

npr=

11p3=

Therefore the number of different ways the positions can be filled by these applicants is 990

Know the answer?
Your Answer:

Post as a guest

Your Name:

What's your source?

Earn Coins

Coins can be redeemed for fabulous gifts.

Not the answer you're looking for?
Ask your own homework help question
Similar Questions
There are three nursing positions to be filled at Lilly Hospital. Position 1 is the day...
There are three nursing positions to be filled at Lilly Hospital. Position 1 is the day nursing supervisor; position 2 is the night nursing supervisor; and position 3 is the nursing coordinator position. There are 19 candidates qualified for all three of the positions. Determine the number of different ways the positions can be filled by these applicants.
4a. A wildlife biologist examines frogs for a genetic trait he suspects may be linked to...
4a. A wildlife biologist examines frogs for a genetic trait he suspects may be linked to sensitivity to industrial toxins in the environment. Previous research had established that this trait is usually found in 1 of every 8 frogs. He collects and examines 12 frogs. If the frequency of the trait has not changed, what is the probability he finds the traits in None of the frogs? At least 2 frogs 4b There are three nursing positions to be filled...
The qualified applicant pool for three management trainee positions consists of eight women and four men....
The qualified applicant pool for three management trainee positions consists of eight women and four men. (a) How many different groups of applicants can be selected for the positions? (b) How many different groups of trainees would consist entirely of women? ( c) Probability extension: If the applicants are equally qualified and the trainee positions are selected by drawing the names at random so that all groups of three are equally likely, what is the probability that the trainee class...
The qualified applicant pool for three management trainee positions consists of six women and six men....
The qualified applicant pool for three management trainee positions consists of six women and six men. (a) How many different groups of applicants can be selected for the positions? (b) How many different groups of trainees would consist entirely of women? (c) Probability extension: If the applicants are equally qualified and the trainee positions are selected by drawing the names at random so that all groups of three are equally likely, what is the probability that the trainee class will...
A contracting company ranks its employees into three levels: Level 1, Level 2, and Level 3....
A contracting company ranks its employees into three levels: Level 1, Level 2, and Level 3. The number of employees that the company currently has at each level is provided below. 9 Level 1 Employees 20 Level 2 Employees 25 Level 3 Employees The company currently has four positions available: Position A, Position B, Position C, and Position D. Position A requires a Level 3 employee. Position B requires a Level 3 employee. Position C requires a Level 2 or...
a housing construction firm plans to fill 3 carpenter's positions from a pool of 5 applicants;...
a housing construction firm plans to fill 3 carpenter's positions from a pool of 5 applicants; 2 plumbers positions from a group of 4 applicants; and 4 electricians from 6 applicants. To determine the number of ways a foreman can hire the carpenters, plumbers, electricians, and all nine of theses craftspeople.
Suppose the number of beds filled per day in a mediumsized hospital is normally distributed. A...
Suppose the number of beds filled per day in a mediumsized hospital is normally distributed. A hospital administrator tells the board of directors that, on the average, at least 184 beds are filled on any given day. One of the board members believes that the average is less than 184 and she sets out to test to determine if she is correct. She secures a random sample of 16 days of data (shown below). Use α = 0.05 and the...
Suppose the number of beds filled per day in a mediumsized hospital is normally distributed. A...
Suppose the number of beds filled per day in a mediumsized hospital is normally distributed. A hospital administrator tells the board of directors that, on the average, at least 184 beds are filled on any given day. One of the board members believes that the average is less than 184 and she sets out to test to determine if she is correct. She secures a random sample of 16 days of data (shown below). Use α = 0.05 and the...
1. Three mutations are listed below for the following mRNA at the positions they occur. Using...
1. Three mutations are listed below for the following mRNA at the positions they occur. Using the genetic code on page 304 of your text determine if the mutation causes a silent, missense or nonsense mutation. 5’ AUG GUC UCA GAC CGG UUA 3’ Mutant 1 A in position 12 Mutant 2 A in position 8 Mutant 3 A in position 13 A. nonsense B. silent C. missense
Ten applicants (3 women and 7 men) for a beginning position with the Sacramento Police Department...
Ten applicants (3 women and 7 men) for a beginning position with the Sacramento Police Department were judged to be fully qualified. The Police Chief has decided to hire three of them using a random lottery. Let X be the number of women hired. (a) Calculate the probability P(X = k) for k = 0, 1, 2, 3. (b) Calculate the expected number of women that will be hired.