Why
Infinity Lyrics


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ねえ どうして?目覚まし時計
ちゃんと鳴らないの?
ねえ どうして?駅まで来て
財布忘れてんの?
ねえ どうして?スマートフォン
すぐに壊れるの?
ねえ どうして?
ムカつくんだけどぉっ!
悩んで悔やんで溜め息ついて
空回りして生きてる日常
唄って笑って泣いて気付いて
強いワタシにあゝいつかは
なれたらいいな...

ねえ どうして?最近アイツと
うまくいかないの?
ねえ どうして?すぐにケンカに
なってしまうの?
ねえ どうして?ゴメンねって
素直に言えないの?
ねえ どうして?
可愛くなれないの?
こんな涙なんか消えちゃえ...
キラキラキララ 魔法みたいにさ...
唄って笑って泣いて気付いて
強いワタシにあゝいつかは
なれたらいいな...

悩んで悔やんで溜め息ついて
空回りして生きてる日常
唄って笑って泣いて気付いて




強いワタシにあゝいつかは
なれたらいいな...

Overall Meaning

The lyrics of Infinity's song "Why" reflect on the daily struggles and frustrations that individuals face in their lives. The first stanza questions the unreliability of everyday objects, such as alarm clocks, smartphones, and wallets. The singer feels trapped in a cycle of disappointment and despair, feeling as if they cannot escape the daily grind. The repeated phrase "nee doushite" emphasizes the sense of bewilderment and confusion that the singer feels, wondering why life seems to be so difficult.


The second stanza reflects on the struggles of personal relationships. The singer questions why they cannot communicate with their partner effectively and why disagreements quickly spiral into arguments. Despite the frustration and sadness they feel, the singer dreams of becoming stronger and more resilient. The repetition of the phrase "nakunade kuyande tameiki tsuite kuuzaride" conveys a sense of weariness and exhaustion, but the chorus provides a glimmer of hope, as the singer hopes to one day become powerful and resilient.


Overall, the lyrics of "Why" are reflective and introspective, exploring the challenges and difficulties of life while acknowledging the possibility of growth and transformation.


Line by Line Meaning

ねえ どうして?目覚まし時計 ちゃんと鳴らないの?
Hey, why doesn't my alarm clock ring properly?


ねえ どうして?駅まで来て 財布忘れてんの?
Hey, why did I forget my wallet after coming all the way to the station?


ねえ どうして?スマートフォン すぐに壊れるの?
Hey, why does my smartphone always break so easily?


ねえ どうして? ムカつくんだけどぉっ!
Hey, why is everything so annoying?!


悩んで悔やんで溜め息ついて 空回りして生きてる日常
I'm constantly worrying and regretting, but my daily routine feels empty and meaningless.


唄って笑って泣いて気付いて 強いワタシにあゝいつかは なれたらいいな...
Sing, laugh, cry, and realize that I hope to become a strong person someday.


ねえ どうして?最近アイツと うまくいかないの?
Hey, why isn't my relationship with that person going well lately?


ねえ どうして?すぐにケンカに なってしまうの?
Hey, why do we always end up fighting?


ねえ どうして?ゴメンねって 素直に言えないの?
Hey, why can't I just be honest and say sorry?


ねえ どうして?可愛くなれないの?
Hey, why can't I become more cute?


こんな涙なんか消えちゃえ... キラキラキララ 魔法みたいにさ...
Let these tears disappear...like magic, with a twinkle.


悩んで悔やんで溜め息ついて 空回りして生きてる日常
I'm constantly worrying and regretting, but my daily routine feels empty and meaningless.


唄って笑って泣いて気付いて 強いワタシにあゝいつかは なれたらいいな...
Sing, laugh, cry, and realize that I hope to become a strong person someday.




Lyrics © O/B/O APRA AMCOS
Written by: Ryo Owatari

Lyrics Licensed & Provided by LyricFind
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Most interesting comments from YouTube:

hamuka

I like how all of these levels can be summarized by a single question each.

Level 1: What's the difference between a really large finite number and infinity?
Level 2: What happens if you try to do basic maths with infinity?
Level 3: How can one kind of infinity be larger than another?
Level 4: What kinds of weird logical consequences are there to the fact that infinity exists?
Level 5: Why are we asking these questions about something we literally can't imagine?

I have never actually had to study maths beyond high school, and videos like this make me feel like I'm missing out. Maybe I'll pick it up for fun once I'm retired. It'll be super interesting to see what mathematicians will come up with until then.



Google made me do it

The college level shows there are different ways to make collections of numbers.

Intuitively, someone would say the natural numbers (0, 1, 2, 3, 4, etc.) are a smaller collection than the collection that is called integers, which contains all the natural numbers AND their negative counterparts (etc., -4, -3, -2, -1, 0, 1, 2, 3, 4, etc.). Then there's another collection called rational numbers. These are all the previous numbers and now they're allowed to have commas (for example 1.25, like dollars and cents).

What she explains at the college level, is how you can prove all three collections are infinite, but one infinity isn't bigger than the others, even though someone with no mathematical knowledge would intuitively state that the rational numbers are more infinite than the integers and the integers are a bigger collection than the collection of natural numbers.

She proves this by assuming numbers are nothing but symbols we use to order a collection. So the numbers in the natural collection could have a value that is similar to the integers or the rational numbers, but because that's not how most humans think of numbers we don't naturally feel inclined to agree with this. I hope you will understand it better by this explanation.

Let's talk money: everyone agrees 500 dollars on your account is more than 2 dollars, -200 dollars would imply you paid for something or have debt.

Let's say we would write down all the numbers that appear on your bank account and order them. We can count them as the amount of transactions. We would start with 0, this is when you opened your bank account. Then we say 1, for example, your first paycheck. Then 2, you bought gas for your truck, which probably has a negative value. 3 is a gas bill, another negative value. 4 could be your friend paying back a pizza, so that's a positive value. And so on, and so on.
As we progress, you will have a very large collection. If you were to live forever, or pass your bank account down to your children and they pass it on to your grandchildren, given enough time, the amount of transactions will become infinite. You may have noticed the numbers we used to rank the transactions are natural numbers. You probably also noticed the values, ie the amount of dollars that were exchanged during that transaction, are part of the rational numbers. Because the natural collection has become infinite over time, your rational collection has become infinite as well. Because we know there are equal amount of natural numbers as there are rational numbers within this bank account, we can agree the infinity of natural numbers is equal to the infinity of rational numbers.



All comments from YouTube:

CrapkinsTheBrave

As a father I can tell you right now that child holds in her hands a jar of infinite glitter

Mia JC

Lmao 😂

Dawn Earp

Well said.

Adam Schehl

Glitter is forever.

David Earhart

😂😂 soo true.

SoldierMed68W

The herpes of the craft world

85 More Replies...

DI KUKU

It was interesting to see, what they talk about in each level.
1. Expert to Child: Talking about mathematics
2. Expert to Teen: Talking about mathematics
3. Expert to College Student: Talking about mathematics
4. Expert to Grad Student: Talking about mathematics
5. Expert to Expert: Talking about philosophy

Wesley Dechavez

because there's no longer any huge gap in their knowledge (expert) so i'm guessing that the only thing they can discuss is about their overall understanding about infinity and it's significance in the world

TamaHawk

What you just laid out is the overall problem with the field of science in general. When you close off the circle and only invite experts to talk to experts no one teaches anything, nothing new is actually invented of real value and all dialog devolves into mental gymnastics and thought exercises.

Valis

Because you can't trick another expert about the existence of infinite out of the world of ideas.

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