cs-2233: checkin assignment 2

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Price Hiller 2024-02-09 13:20:50 -06:00
parent 46151a1498
commit c870c2f098
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4 changed files with 125 additions and 1 deletions

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#let m(math) = align(center)[$#math$]
#let pgbreakmsg = align(center, text(blue, weight: "black", size: 1.5em)[See Next Page\ ↓])
#let solve(work, solution) = align(
center,
)[
#let solution = align(center, block(
inset: 5pt,
stroke: blue + .3pt,
fill: rgb(0, 149, 255, 15%),
radius: 4pt,
)[#align(left)[#solution]])
#if work == [] [
#solution
] else [
#block(inset: 6pt, radius: 4pt, stroke: luma(50%) + .5pt, fill: luma(90%))[
#align(left, text(font: "Liberation Sans", size: .85em, work))
#solution
]
]
]
#let problem-header(number, points) = [== Problem #number. #text(weight: "regular")[[#points
points]]]
#let problem(number, points, body) = [
== Problem #number. #text(weight: "regular")[[#points points]]
#body
]
#set page(margin: (x: .4in, y: .4in))
#set table(align: center)
_*Price Hiller*_
#v(-.8em)
_*zfp106*_
#v(-.8em)
Homework Assignment 3
#v(-.8em)
CS 2233
#v(-.8em)
Section 001
#align(
center,
block(
inset: 6pt,
radius: 4pt,
stroke: luma(50%) + .5pt,
fill: luma(90%),
)[If you are interested in viewing the source code of this document, you can do so
by clicking
#text(
blue,
link(
"https://git.orion-technologies.io/Price/college/src/branch/Development/Spring-2023/CS-2233/Assignment-3/Solution.typ",
"here",
),
).],
)
= Problems
#problem(
1,
10,
)[
- Complete all participation activities in zyBook sections $2.1$, $2.2$, $2.4$-$2.6$.
#solve[][Done]
]
#problem(
2,
10,
)[
Prove that if $a$, $b$, and $c$ are odd integers, then $a + b + c$ is an odd
integer.
#solve[
An odd integer is expressed as $2k + 1$ where $k$ is some integer.
][
$a + b + c$ can be rewritten as $(2z + 1) + (2n + 1) + (2p + 1)$. Working this
equation we end up with: $2z + 2n + 2p + 3$. We can then factor out $2$ giving
us $2(z + n + p) + 3$ and with some additional manipulation we can get $2((z + n + p) + 1) + 1$.
Notice the inner part ($(z + n
+ p) + 1 $) could be re-expressed as $k$, thus we can rexpress the entire thing
(with a substitution) as $2k + 1$ where $k = (z + n + p + 1)$. Therefore, if $a$, $b$,
and $c$ are odd integers, then $a + b + c$ is an odd integer.
]
]
#problem(
3,
30,
)[
Recall that a rational number can be put in the form $p/q$ where $p$ and $q$ are
integers and $q
≠ 0$ Prove the following for any rational number, $x$:
a.) If $x$ is rational, then $x - 5$ is rational
b.) If $x - 5$ is rational, then $x/3$ is rational
c.) If $x/3$ is rational, then $x$ is rational
]
#pgbreakmsg
#pagebreak()
#problem(
4,
20,
)[
Consider the following statement: For all integers $m$ and $n$, if $m - n$ is
odd, then $m$ is odd or $n$ is odd.
a. Prove the statement using a proof by contrapositive
b. Prove the statement by using a proof by contradiction
]

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* DONE Assignment 1
* DONE Assignment 1 :college:cs2233:
DEADLINE: <2024-01-26 Fri> SCHEDULED: <2024-01-25 Thu>
Complete Zybooks section ~1~ and the first homework assignment
* TODO Assignment 3 :college:cs2233:
DEADLINE: <2024-02-11 Sun> SCHEDULED: <2024-02-11 Sun>
Complete Zybooks section ~2~ and the third homework assignment