Lets do something meaningless... :P

I was tired solving maths problems , then I stopped for a minute and I thought of doing something meaningless which includes my friend Trevor A (prototype) and the brilliant avatar Trevor B.So what I am going to prove where $TREVOR$ is an integer is that :

$\Large min(TREVOR) = \pm 1$

Proof:

Lets assume that $TREVOR \ A > TREVOR \ B$ .

But $1<2 \Rightarrow A<B$

By multiplying both the sides by $TREVOR$ , the inequality sign flips which tells us that:

$\Large min(TREVOR) = -1$

Lets consider another case $TREVOR \ A < TREVOR \ B \\ A < B$

By multiplying both the sides by $TREVOR$ , the inequality sign remains the same which tells us that :

$\Large min(TREVOR) = 1$

Let us consider one more case $TREVOR \ A = TREVOR \ B$

But $A<B$ makes it impossible hence , $TREVOR \ A \neq TREVOR \ B$ . Hence this case does not hold true.

At last we conclude that $min(TREVOR) = \pm 1$

I hope this made you feel nice in your busy study schedule.Cheers!

#Algebra #Trevor

Easy Math Editor

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Comments

@Nihar Mahajan, as a continued exercise, prove the following:

$\zeta(\textrm{TREVOR A})=69$

Prasun Biswas - 6 years, 1 month ago

So you're telling me that $\text{TREVOR A}=1.014615241815$ ?

This might be a new discovery you've had... As it follows the constraint that $min(TREVOR)=\pm1$

Trevor Arashiro - 6 years, 1 month ago

Should I publish the proof myself in Arxiv?

I also have a maximum upper bound for the A version but I'm lacking a complete proof since I haven't researched on the B version.

Prasun Biswas - 6 years, 1 month ago

Lol. But i don't know zeta function yet. :(

Nihar Mahajan - 6 years, 1 month ago

Let me enlighten you. The value $\zeta(\textrm{TREVOR A})$ is a special value, unlike the rest of the zeta function values. I suspect that it might be the key to proving the Trevormann hypothesis since it has a real part of $69$ and is still a zero of the Trevormann zeta function.

@Pi Han Goh, I think you should look into this. We have stumbled upon yet another discovery. Shall we uncover it together?

Prasun Biswas - 6 years, 1 month ago

@Prasun Biswas – LOL...Omg ... if its established , it would be really amazing :P

Nihar Mahajan - 6 years, 1 month ago

:3 this actually made me laugh pretty hard. Haha.

But you forgot to consider the case of $TREVOR=0$ . In which case the world implodes.

Trevor Arashiro - 6 years, 1 month ago

Kaboobly Doo!

Agnishom Chattopadhyay - 6 years, 1 month ago

Yeah, Kaboobly Doo Stuff :P XD

Mehul Arora - 6 years, 1 month ago

@Trevor Arashiro @Trevor B. Do read this note. :P

Nihar Mahajan - 6 years, 1 month ago

Well the proof is not complete, you need to prove that A <B ...... 😛😛

Harsh Shrivastava - 6 years, 1 month ago

I have proved it. A=1 , B=2 so , A < B . :P

Nihar Mahajan - 6 years, 1 month ago

How can u assume that A = 1 & B= 1?? :P

Harsh Shrivastava - 6 years, 1 month ago

@Harsh Shrivastava – @Harsh Shrivastava , He assumed the values of A and B to Be their "Place" values in the alphabet :P. Also, Nice Proof, @Nihar Mahajan XD

Mehul Arora - 6 years, 1 month ago

@Mehul Arora – ikr , XD :P

Nihar Mahajan - 6 years, 1 month ago

LOL , What is this? Are you okay?

Nitesh Chaudhary - 6 years ago

Yes , I am okay. If you don't understand its ok.Its just a time pass stuff.

Nihar Mahajan - 6 years ago

Math	Appears as
Remember to wrap math in `\(` ... `\)` or `\[` ... `\]` to ensure proper formatting.
`2 \times 3`	$2 \times 3$
`2^{34}`	$2^{34}$
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`\frac{2}{3}`	$\frac{2}{3}$
`\sqrt{2}`	$\sqrt{2}$
`\sum_{i=1}^3`	$\sum_{i=1}^3$
`\sin \theta`	$\sin \theta$
`\boxed{123}`	$\boxed{123}$