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| | ==Explanation== | | ==Explanation== |
| − | [[Megan]] is about to buy an apple at a grocery store when she is surprised that the price is exactly one dollar. A common practice in pricing items is to deliberately make them slightly less than a round number, such as $1.99 or $1.95 instead of $2, as a psychological trick to make the item seem significantly cheaper than it really is, as "less than two dollars" sounds much less than "two dollars" even though the difference of 0.01 is minimal. Additionally, in most cases in the US, {{w|Sales taxes in the United States|sales tax}} must be taken into account, as it is generally not included in the list price (although, [https://taxfoundation.org/which-states-tax-groceries/ most states] do exempt food sold in grocery stores from sales taxes), so a price rarely comes out to a round value. That it came out to an exact dollar is so strange for Megan that it throws her for a loop. Buying one apple for one dollar feels to her more like a simplified, imaginary ''Idea'' of a transaction (a "{{w|Platonic Ideal}}") than like something that could actually happen in real life.
| + | {{incomplete|Created by an APPLE - Please change this comment when editing this page. Do NOT delete this tag too soon.}} |
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| − | Megan likely shares Randall's background in engineering and math. When learning science, engineering, and math in the education system, one studies examples where every number is some round value, and all situations are simplified to the barest essentials so as to demonstrate the ideas being taught. Then, when doing real problems in the real world, one spends the rest of one's life almost never being able to use the simplified tricks demonstrated as examples in school, because when math is used to describe the natural world, nothing is ever a round number unless by design. | + | [[Megan]] is about to buy an apple at a grocery store when she is surprised that the price is exactly one dollar. In most cases in the US, {{w|Sales taxes in the United States|sales tax}} must be taken into account, but most states exempt food sold in grocery stores, so the price comes out to a round value. Megan begins overthinking the whole situation, so the cashier raises the price to an arbitrary non-rounded value, which seems to calm her down. |
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| − | Megan references {{w|Platonic Idealism}}, which is the theory attributed to Plato that abstract or non-physical Ideas represent the purest, most accurate version of reality, but we can only perceive of more flawed versions of Ideas because of our limited viewpoint (as explained in his Allegory of the Cave). Thus we can understand the concept of a perfect circle or a perfect line, even though we have never seen one, and cannot create one. Megan believes she has glimpsed a Platonic Ideal because the absolute concept of currency is it is the exact worth of something in trade. Megan is awed because, if this is true, then she is witnessing the next layer of reality, which Plato often compared to heaven. | + | Megan's "overthinking" refers to common parameters used in solving science or math questions. A {{w|Frictionless plane}} is a scenario from the writings of Galileo to calculate the movement of an object down an {{w|inclined plane}}. However, his equations did not account for {{w|friction}}. |
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| − | The harsh difference between being able to buy an apple for a dollar at this quaint store, and having to deal with arbitrary decimals and numbers in the rest of life could be touching on Megan's life experience of the world not being what she was prepared for, resulting in her intense response. Regardless if that is true or not, it seems the cashier is unable to figure out how to handle it (or does not want to), and raises the price to an arbitrary non-rounded value, which has the intended effect of halting Megan's outburst. The unexpected resolution of the rising tension is a source of humor in this strip.
| + | "A train leaving Chicago at 40 mph" refers to common math questions, involving trains and solving for the distance required to overtake said train, although this problem involves the rather unrealistic assumption that the train's velocity keeps constant. Like the frictionless plane, this is a common simplification that allows the problem to be solved with quite simple techniques, just like having round quantities (e.g. 1 dollar/apple) eases arithmetic problems. |
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| − | Megan's references refer to common parameters used in solving science or math questions. A {{w|frictionless plane}} is a scenario from the writings of Galileo to calculate the movement of an object down an {{w|inclined plane}}, since his equations did not account for {{w|friction}}. Frictionless spaces have been mentionned back in [[669: Experiment]]. | + | ;Title text |
| | + | Apparently Megan only has a dollar, so she would not be able to buy a whole apple at the new price (0.4608 × $2.17 ≈ $1). Stores usually sell whole apples, so asking for a fraction of one is not likely to work out. |
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| − | "A train leaving Chicago at 40 mph" refers to common math questions, involving trains and solving for the distance required to encounter said train, although this problem involves the rather unrealistic assumption that the train's velocity keeps constant and doesn't need to accelerate in order to reach its speed. Like the frictionless plane, this is a common simplification that allows the problem to be solved with quite simple techniques, just like having round quantities (e.g. 1 dollar/apple) eases arithmetic problems. Apples themselves are commonly used as units for math problems, including problems as simple as basic arithmetic.
| + | ==Transcript== |
| | + | {{incomplete transcript|Do NOT delete this tag too soon.}} |
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| − | The comic repeats a common theme in the strip of engineers and computer scientists trying to apply their technical experience to social situations. In this case, the conversation partner is "normal", and does not respond supportively, which is a common situation in the real world and a possible point of empathy with readers. -- An alternate viable reading is that the conversation partner responds extremely supportively (by cleverly removing the source of Megan's distress, rather than by questioning the validity of Megan's response). This is a possible point of wish-fulfillment for readers.
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| − | It seems that according to the title text, Megan only has (or only wants to spend) one dollar, so she would not be able to buy a whole apple at the new price (0.4608 × $2.17 ≈ $1). Stores usually sell whole apples, so asking for a fraction of one is not likely to work out.{{Citation needed}}
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| − | At the time that this comic was made, there used to be stores (such as {{w|Dollar Tree}}) that sold all kinds of their items for only a dollar. However, in 2022, the last of these thrift chains, {{w|Family Dollar}}, finally stopped selling items for merely a dollar or less: although, some stores (including other fellow {{w|Dollar Store|dollar store}} brands) likely still sell items for this meager price, at least in some regions.
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| − | ==Transcript==
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| | :[Megan is at the store counter, behind which Ponytail (the cashier) is waiting.] | | :[Megan is at the store counter, behind which Ponytail (the cashier) is waiting.] |
| | :Megan: Just this apple, thanks. | | :Megan: Just this apple, thanks. |
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| | [[Category:Comics featuring Megan]] | | [[Category:Comics featuring Megan]] |
| | [[Category:Comics featuring Ponytail]] | | [[Category:Comics featuring Ponytail]] |
| − | [[Category:Money]]
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