Check the files

Name _________________________________ I.D. Number _______________________

Project 4 MTHH 043

Project 4 Evaluation 34

Precalculus: Analytic Geometry & Algebra (MTHH 043 059)

Be sure to include ALL pages of this project (including the directions and the

assignment) when you send the project to your teacher for grading. Don’t forget to put your name

and I.D. number at the top of this page!

This project will count for 10% of your overall grade for this course. Be sure to read all the

instructions and assemble all the necessary materials before you begin. You will need to print this

document and complete it on paper. Feel free to attach extra pages if you need them.

To earn full credit, you must justify your solutions by showing your work.

When you have completed this project you may submit it electronically through the online course

management system by scanning the pages into either .pdf (Portable Document Format), or .doc

(Microsoft Word document) format. If you scan your project as images, embed them in a Word

document in .gif image format. Using .gif images that are smaller than 8 x 10 inches, or 600 x 800

pixels, will help ensure that the project is small enough to upload. Remember that a file that is larger

than 5,000 K will NOT go through the online system. Make sure your pages are legible before you

upload them.

Be sure to show all your work for full credit.

1. Find the roots of the function, and write the solution in factored form:

  4 2f x x 3x – 4, if x –2i is one root.  

Find a formula for the nth term of the sequence. Show your work.

2.

3. 2, 5, 10, 17, 26, . . .

Project 4 MTHH 043

4.

Find the sums of the given geometric series. Show your work.

5.

6.

k 1

k 1

3 2

4





     



7. Use geometric series to find the rational number represented by the repeating decimal: .036 .

Use the Binomial Theorem to expand each expression. Show your work.

8.   4

2x 1

9. 5

(x y )

Project 4 MTHH 043

Use mathematical induction to prove the following statements. Show your work.

10. 3n (n 1)

3 6 9 . . . 3n 2

     

11.  2 3 n n 4

4 4 4 . . . 4 4 1 3

     

Let z1 = 3 – 4i and z2 = – 1 – i . Perform the indicated operations and write the solutions in the

form a + bi. Show your work.

12. 1 2z – z

13. 1

2

z

z

14. 2z

15. 1z (conjugate)

Project 4 MTHH 043

16. Find a polynomial function with real coefficients that has – 2 and 3i as its roots. Express

your answer is standard form. Show your work.

17. Let z1 = – 2i , z2 = 5 – 2i , z3 = – 3 + 5i . Locate z1, z2, and z3 on the same complex

plane.

18. Find the value of the sum. Show your work. 4

k

k 1

2 



19. Write   3f x x 25x   in factored form, and find the roots of f (x). Show your work.

20. Find a polynomial function with real coefficients that has 3 and – 2i as its roots. Express your

answer is standard form. Show your work.

21. Express the finite sum in summation notation and show your work: – 2 + 4 – 8 + 16 – 32 +

64

Project 4 MTHH 043

Must show your work. If 10 people apply for 3 jobs, in how many ways can people be chosen for the

jobs:

22. If the jobs are all the same.

23. If the jobs are all the different.

Find the limit of each expression. Show your work.

24. 2n

2 3n lim

n 6n





25.

n

n

5 lim

2

     

Declaration

I know that plagiarism is wrong. Plagiarism is to use another’s work and pretend that it is one’s own.

I declare that this is my own work.

Signature _________________________________ Student I.D. number ________________

This project can be submitted electronically. Check the Project page under “My Work” in the

UNHS online course management system.

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