“If you work in retail make a fake e-mail and write an e-mail to your boss/store praising yourself. Works like a charm and will likely save you from the next round of cuts.”
— Life Hacks For People With No Moral Compass (x)
"I'm Dorothy Gale from Kansas"
DEAR READER

★
KIROKAZE
macklin celebrini has autism
Cosmic Funnies
hello vonnie

blake kathryn
tumblr dot com
Jules of Nature
Peter Solarz
RMH
occasionally subtle
NASA

JVL
cherry valley forever

Product Placement
Lint Roller? I Barely Know Her

roma★
taylor price
seen from Brunei

seen from United States
seen from Uruguay
seen from Austria
seen from Bangladesh
seen from United States

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seen from Nepal
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seen from Bangladesh
@stickylizard
“If you work in retail make a fake e-mail and write an e-mail to your boss/store praising yourself. Works like a charm and will likely save you from the next round of cuts.”
— Life Hacks For People With No Moral Compass (x)
Can’t risk it
The duck of creativity. I waited so long for it.
op: *knock knock*
them:
:V
:V :V :V :V :V
This Rat Has Been Trained to Paint With Its Feet and It’s Surprisingly Adorable
the best thing you will see all year
idk why, but for some reason i find photoshopped pictures of poptart boxes with fake ridiculous, outrageous flavor names to be the funniest freaking thing
like this is hysterical
I’m interested in Frosted Water
Theres a reddit page
My favourite math fact is that 0.9999999.. is equal to 1. Exactly. Not approximately. Not as a rounded number. 0.9999 (recurring) is exactly 1.
Question. How the fuck does that work?
I tried explaining it here:
Here’s another perspective on why .999… repeating is exactly equal to 1.
For any two distinct real numbers, we can always find a rational number strictly between them, i.e. that rational number must be able to be expressed as a terminating decimal or a repeating decimal. To be clear, that rational number is strictly between the two values; it is not allowed to be equal to either.
Suppose k is a rational number strictly between 1 and 0.9999…. If this is possible, then, I can write k exactly as either a decimal with finite digits, or I can write k as a repeating decimal. The problem is, there are no decimals with finite digits between 1 and 0.999… , and there is no way to write a repeating decimal that is greater than 0.999… and still less than 1. Either way, a k strictly between 1 and 0.999… does not exist. The only way this can be true is if those two numbers are not actually distinct. That is to say, 1 = 0.999…..
i truly appreciate how math seems like it’s this infallible always-true only-one-answer thing, when in reality math is just like:
I just said “I am Moana from Motunui, you killed my father, prepare to die” and it actually took me a few seconds to realize that’s not right