User:Zork Implementor L/1=2

MINITRUE APPROVED Minitrue mark article doubleplusgoodthink. Miniluv make goodthink fullwise.

One of the great truths of the universe is the fact that 2 is the same as 1.

1=2 graph[edit | edit source]

You can clearly see in the following graph that for most random points plotted, 1 = 2.

Proof[edit | edit source]

• Everyone knows this:

${\displaystyle {\frac {-1}{1}}={\frac {1}{-1}}}$

• Now we will square root both sides:

${\displaystyle {\sqrt {\frac {-1}{1}}}={\sqrt {\frac {1}{-1}}}}$

• Now we break up the roots:

${\displaystyle {\frac {\sqrt {-1}}{\sqrt {1}}}={\frac {\sqrt {1}}{\sqrt {-1}}}}$

• The square root of a negative 1 is i and the square root of 1 is 1. In other words:

${\displaystyle {\frac {i}{1}}={\frac {1}{i}}}$

• Now we divide the entire thing by 2:

${\displaystyle {\frac {i}{2}}={\frac {1}{2i}}}$

• Now let's add ${\displaystyle \textstyle {\frac {3}{2i}}}$ to make the math easier.

${\displaystyle {\frac {i}{2}}+{\frac {3}{2i}}={\frac {1}{2i}}+{\frac {3}{2i}}}$

• Now we can multiply the entire thing by i:

${\displaystyle i\left({\frac {i}{2}}+{\frac {3}{2i}}\right)=i\left({\frac {1}{2i}}+{\frac {3}{2i}}\right)}$

• So now we expand this beast:

${\displaystyle {\frac {i^{2}}{2}}+{\frac {3i}{2i}}={\frac {i}{2i}}+{\frac {3i}{2i}}}$

• We know that the square root of -1 is i, so i² must be -1:

${\displaystyle {\frac {-1}{2}}+{\frac {3i}{2i}}={\frac {i}{2i}}+{\frac {3i}{2i}}}$

• Now we simplify the i's

${\displaystyle {\frac {-1}{2}}+{\frac {3}{2}}={\frac {1}{2}}+{\frac {3}{2}}}$

• Let's calculate this thing:

${\displaystyle {\frac {2}{2}}={\frac {4}{2}}}$

• And so

${\displaystyle 1=2}$

Another Proof[edit | edit source]

• Let a = b
• now, a² = b² = ab
• a² - b² = a² - ab
• (a+b)(a-b) = a(a-b)
• Now, divide both members by (a-b).
• a+b = a
• a+a = a
• 2a = a
• 2 = 1

Yet Another Proof[edit | edit source]

• This is the expansion of the natural logarithm of 2

${\displaystyle \log 2=1-{\frac {1}{2}}+{\frac {1}{3}}-{\frac {1}{4}}+{\frac {1}{5}}-{\frac {1}{6}}+\cdots }$

• Now separate out the even-numbered fractions from the odd-numbered ones

${\displaystyle \log 2=\left(1+{\frac {1}{3}}+{\frac {1}{5}}+{\frac {1}{7}}+\cdots \right)-\left({\frac {1}{2}}+{\frac {1}{4}}+{\frac {1}{6}}+{\frac {1}{8}}+\cdots \right)}$

• a-b=a+b-2b, so

${\displaystyle \log 2=\left(1+{\frac {1}{3}}+{\frac {1}{5}}+{\frac {1}{7}}+\cdots \right)+\left({\frac {1}{2}}+{\frac {1}{4}}+{\frac {1}{6}}+{\frac {1}{8}}+\cdots \right)-2\,\left({\frac {1}{2}}+{\frac {1}{4}}+{\frac {1}{6}}+{\frac {1}{8}}+\cdots \right)}$

• Now simply combine the first two terms and distribute the 2 throughout the third term

${\displaystyle \log 2=\left(1+{\frac {1}{2}}+{\frac {1}{3}}+{\frac {1}{4}}+{\frac {1}{5}}+{\frac {1}{6}}+\cdots \right)-\left(1+{\frac {1}{2}}+{\frac {1}{3}}+{\frac {1}{4}}+{\frac {1}{5}}+{\frac {1}{6}}+\cdots \right)}$

• The two remaining terms are the same, so

${\displaystyle \log 2=0}$

• Now since e⁰=1, log 1=0 also

${\displaystyle \log 2=\log 1}$

• Now just take the exponential of both sides

${\displaystyle 2=1}$

“But maybe log2 isn't 0”

~ Mathmatician on this proof

add log 2

${\displaystyle 2\log 2=\log 2}$

divide by log 2

${\displaystyle 2=1}$

Even More Perfectly Correct Proof[edit | edit source]

• Let's assume that 1=2

${\displaystyle 1=2}$

• Since we asumed that 1=2 we can replace 1 with 2

${\displaystyle 2=2}$

And since 2=2 is correct, our assumption that 1=2 must also be correct

Yet Another Another Proof (probably the simplest)[edit | edit source]

• We all know that 0 = 0, right?
• 0 = 0
• Any number multiplied with 0 equals 0.
• 1 × 0 = 2 × 0
• Now we simplify the operation.
• 1 = 2

Simple enough, right?

Note: When simplifying, be careful when you divide by zero. The effects could be devastating.

Not Convinced?[edit | edit source]

We can state that anything to the power of zero will always equal 1, any given number⁰ = 1, so working backwards, we can logicaly state that ${\displaystyle \textstyle {\sqrt[{0}]{1}}}$ = any given number. Now after much thinking and unnecessary government funding, top mathematicians can firmly state that numbers 1 and 2 are in fact "any given numbers". Therefore, we can definitively state that ${\displaystyle 1={\sqrt[{0}]{1}}=2}$.

Still Not Convinced?[edit | edit source]

And if you are a die-hard TwoDoesNotEqualOne-ist, one can convert from a base 0 number system. Number systems always have a maximum value of the number to the power of ${\displaystyle n-1}$ in each place. In any given place, we can see a 1 as the first integer available in that place. Since in the first place, ${\displaystyle 0^{n-1}=0^{1-1}=0^{0}=0}$, we can fill this with a 1. If we move over one place, we get ${\displaystyle 0^{2-1}}$ which is also 0. Since increasing one integer value increased the value by 0 when converted back to a base 10 format, we can see that ${\displaystyle 0=1}$. This also means that every whole number equals 0. However, since every irrational and decimal number can be expressed in similar terms, it can be concurred that every number must logically = 0. Since every number = 0, and ${\displaystyle 1=0}$, every number equals 1, and thus ${\displaystyle 2=1}$.

Not Convinced Yet?[edit | edit source]

The principle of MI is very useful. It can be used to prove lots of things!

• Theorem: A positive integer n is equal to any positive integer which does not exceed it.

• Proof by induction:

Case ${\displaystyle n=1}$. The only positive integer which does not exceed 1 is 1 itself and ${\displaystyle 1=1}$.

Assume true for ${\displaystyle n=k}$. Then ${\displaystyle k=k-1}$. Add 1 to both sides and get

${\displaystyle k+1=k}$

• Corollary: All numbers are equal.
• Proof:

Since from above all numbers are equal to the number not exceeding itself it follows that any number larger than a given number must equal the given number.

${\displaystyle k+1=k}$

Thus by reflexivity of the equality relation

${\displaystyle k=k+1}$

Thus for any given number ${\displaystyle k}$ there exists a number exactly one larger than ${\displaystyle k}$ that is its equal. Letting ${\displaystyle k=1}$,

${\displaystyle 1=2}$

See now you know the secrets of math.....

Still More Proof[edit | edit source]

First to prove that 0.9999...=1.

${\displaystyle 0.333333...=1/3}$

Now we mutiply by 3.

${\displaystyle 0.9999...=3/3=1}$

If you subtract 0.999..., you get 0.00000...1=0, And since x+0=x,

${\displaystyle 1+(\infty \times 0.000...1)=2}$ and ${\displaystyle 0.0000...1=0,1=2.}$

Effects of 1=2[edit | edit source]

Winston Churchill is a carrot[edit | edit source]

• Winston Churchill has 0 leafy tops. But 1=2, and subtracting 1 gives 0=1. Therefore, Churchill has 1 leafy top.

• Churchill has 2 arms. We've shown that 0=1—now if you multiply by 2, 0=2. Churchill has 0 arms.

• Take Churchill's waist size in inches. Let it equal x. Now, multiplying the previous equation 0=1 by x gives 0=x. So, Winston Churchill tapers to a point.

• Take the wavelength of any photon of light emitted from Churchill. Let it equal y. By a process demonstrated earlier, 0=y. Now take a previously-used equation, 0=1, and multiply it by 640nm:

${\displaystyle 0=640\,{\text{nm}}}$

But 0=y:

${\displaystyle y=640\,{\text{nm}}}$

So the wavelength of any photon of light emitted from Churchill is 640nm, a bright shade of orange.

Winston Churchill has no arms, a leafy top, he tapers to a point and is orange. Winston Churchill is a carrot. The implications for vegetable rights are astounding. But most people are similar to Winston Churchill (0 leafy tops and have a waistline) and therefore are also carrots

In class, your tests count twice[edit | edit source]

• If you studied for one day, you really studied for two days.

• If you lost your study packet, you really lost it twice.

• If you forget the answer to one question, you really forgot the answers to 2 questions.

• If you got a 64% on the test, then you really got a 128%.

• If you cry yourself to sleep for one night, you really cried yourself to sleep for two nights.

Other effects[edit | edit source]

• "2 for 1" sales are the ultimate in deceptive marketing strategies.
• Finger counting is fundamentally flawed.
• "One-potato-two" is entirely fruitless.
• The phrase "killing two birds with one stone" should be reconsidered.
• The expression "When you've seen one, you've seen them all" is literally true in all circumstances.
• People only have 1 eye, 2 belly buttons, 1 arm and 1 leg.
• I only have 1 ear, which explains why I only hear half of what my wife says. And since she has 2 mouths, I really only hear a quarter of what she's saying.
• The Count from Sesame Street represents the pinnacle of immorality.
• By purchasing one meal at an all-you-can-eat buffet, you actually purchased more-than-you-can-eat.

Help and Support[edit | edit source]

In addition to this, Uncyclopedia humbly begs for help all over the world. People, open thy eyes and understand thy real value of 1 (that which is 2). Lieth not in this massive cheat that has gaineth popularity everywhere, including the Interneth. Stop this wrong propaganda that has been going on for centuries and help spread the real knowledge. It's up to thee!