Predicate Logic and Popular Culture (Part 262): Kansas

Let $H$ be the set of all things, and let $F(x)$ be the statement “ $x$ lasts forever.” Translate the logical statement

$F(earth) \land F(sky) \land \forall x \in H ((x \ne earth \land x \ne sky) \Longrightarrow \sim{F(x)})$

This matches a line from the classic song “Dust in the Wind” by Kansas.

Context: This semester, I taught discrete mathematics for the first time. Part of the discrete mathematics course includes an introduction to predicate and propositional logic for our math majors. As you can probably guess from their names, students tend to think these concepts are dry and uninteresting even though they’re very important for their development as math majors.

In an effort to making these topics more appealing, I spent a few days mining the depths of popular culture in a (likely futile) attempt to make these ideas more interesting to my students. In this series, I’d like to share what I found. Naturally, the sources that I found have varying levels of complexity, which is appropriate for students who are first learning prepositional and predicate logic.

When I actually presented these in class, I either presented the logical statement and had my class guess the statement in actual English, or I gave my students the famous quote and them translate it into predicate logic. However, for the purposes of this series, I’ll just present the statement in predicate logic first.

Predicate Logic and Popular Culture (Part 261): Spiderman 2

Let $p$ be the statement “You are late,” and let $q$ be the statement “I am paying for those.” Translate the logical statement

$p \land \sim q$

This matches a tragicomic line from the opening of “Spiderman 2.”

Predicate Logic and Popular Culture (Part 260): Ratatouille

Let $P$ be the set of all people, and let $C(x)$ be the statement “ $x$ can cook. Translate the logical statement

$\forall x \in P (C(x))$

This matches a line from the animated film Ratatouille.

Predicate Logic and Popular Culture (Part 259): The Hunchback of Notre Dame

Let $p$ be the statement “I was in their skin,” and let $q$ be the statement “I treasure every instant.” Translate the logical statement

$p \Longrightarrow q$

This matches one of the great lines of “Out There” from “The Hunchback of Notre Dame.”

Predicate Logic and Popular Culture (Part 258): Kevin Sharp

Let $P$ be the set of all people, and let $K(x)$ be the statement “ $x$ knows it.” Translate the logical statement

$K(I) \land \forall x \in P (x \ne I \Longrightarrow \sim{K(x)})$

This matches the refrain from the sad country ballad “Nobody Knows” by Kevin Sharp.

Predicate Logic and Popular Culture (Part 257): The Wizard of Oz

Let $P$ be the set of all places, and let $H(x)$ be the statement “ $x$ is like home.” Translate the logical statement

$\sim \exists x \in P (H(x))$

Of course, this matches the famous line from “The Wizard of Oz.”

Predicate Logic and Popular Culture (Part 256): Nena

Let $T$ be the set of all times, let $P$ be the set of all places, and let $C(x,t)$ be the statement “I will you build you a castle out of sand at place $x$ and time $t$ . Translate the logical statement

$\exists x \in P \exists t \in T (C(x,t))$

This matches the first line of the chorus of “Irgendwie, Irgendwo, Irgendwann” by Nena.

Predicate Logic and Popular Culture (Part 255): The Nightmare Before Christmas

Let $p$ be the statement “I can see it,” and let $latex q” be the statement “I can believe it.” Translate the logical statement

$\sim ( \sim p \Longrightarrow \sim q)$

This matches a line from “Jack’s Obsession” in the movie “The Nightmare Before Christmas.” (It’s also a good exercise in using DeMorgan’s Laws.)

Predicate Logic and Popular Culture (Part 254): The Rolling Stones

Let $T$ be the set of all times, let $H$ be the set of all things, let $W(x,t)$ be the statement “I need $x$ at time $t$ ,” and let $G(x,t)$ be the statement “I get $x$ at time $t$ .” Translate the logical statement

$\sim \forall t \in T \forall x \in H (W(x,t) \Longrightarrow G(x,t))$

This matches the title and chorus of “You Can’t Always Get What You Want” by the Rolling Stones.

Predicate Logic and Popular Culture (Part 253): Brad Paisley

Let $p$ be the proposition “I love her,” and let $q$ be the statement “I love to fish.” Translate the logical statement

$p \land q$

This matches the opening words of Brad Paisley’s “I’m Gonna Miss Her,” providing a light-hearted example of how the conjunction but is nevertheless translated as $\land$ .