Name (PRINTED):

Student ID #:

Section # (or TA's:

name and time)

CMSC 250

Quiz #5

Monday, Oct. 8, 2001

Write all answers legibly in the space provided. The number of points possible for each question is indicated in square brackets - the total number of points on the quiz is 30, and you will have exactly 15 minutes to complete this quiz. You may not use calculators, textbooks or any other aids during this quiz.

[20 pnts.] Disprove by counter example or Prove each of the following:
1. The sum of any rational number and any integer is rational.
2. If is an odd integer, then $n^2 \equiv 1 \,\,\,mod \,\,\,2$ .
[4 pnts.] Write the standard factored form of 1050:

[6 pnts.] Use the unique factorization theorem and suppose that m is an integer such that

$\begin{displaymath} 5 * 4 * 3 * 2 * m = 10 * 11 * 12 * 13 \end{displaymath}$

Circle Yes or No for each of the following: Yes means that this is something that must be true, No means it doesn't necessarily need to be true:

a) $10 \vert m$ YES NO

b) $11 \vert m$ YES NO

c) $12 \vert m$ YES NO

d) $13 \vert m$ YES NO

e) $24 \vert m$ YES NO

f) $143 \vert m$ YES NO

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John Arras
2001-10-10

Name (PRINTED):
Student ID #:
Section # (or TA's:
name and time)


a)	$10 \vert m$	YES	NO


b)	$11 \vert m$	YES	NO


c)	$12 \vert m$	YES	NO


d)	$13 \vert m$	YES	NO


e)	$24 \vert m$	YES	NO


f)	$143 \vert m$	YES	NO