I'm procrastinating actual work so I made some pop art-ish variations on my paw print design while I have inkscape open

Andulka
Not today Justin
KIROKAZE

#extradirty
Today's Document
Mike Driver
"I'm Dorothy Gale from Kansas"
Sade Olutola

titsay
ojovivo

PR's Tumblrdome

JVL
Lint Roller? I Barely Know Her

shark vs the universe

bliss lane

Love Begins
I'd rather be in outer space 🛸
Noah Kahan
Claire Keane
taylor price

seen from Türkiye

seen from Italy
seen from United States
seen from Colombia
seen from Türkiye

seen from United States

seen from United Kingdom
seen from Italy
seen from United States
seen from United States
seen from United Kingdom
seen from Colombia

seen from United States
seen from Türkiye

seen from Italy
seen from France
seen from Portugal

seen from Germany
seen from Germany
seen from United States
@bewarewoof
I'm procrastinating actual work so I made some pop art-ish variations on my paw print design while I have inkscape open

Anya is live and ready to show you everything. Watch her strip, dance, and perform exclusive shows just for you. Interact in real-time and make your fantasies come true.
Free to watch • No registration required • HD streaming
Girlaragi is more real than ever 💞
Full context and also an uncensored version if anyone wants it 😈 (I didn't put it first so ppl don't get jumpscare by girlaragi getting her tiddies sucked)
absolutely none of these kids are okay oh my god
Lapras is such a serene and pretty Pokemon, easily one of my faves 💙

Anya is live and ready to show you everything. Watch her strip, dance, and perform exclusive shows just for you. Interact in real-time and make your fantasies come true.
Free to watch • No registration required • HD streaming
my house is scary at night
Interpreted this initially not as shelves, but as your cat having erected defensive fortifications
I don't think this is possible????
Hello Ryan I am here to help. So the first step is pretty easy: Three cheeseburgers are worth 18, so each one is worth 6. If these are dollars, that's a steal!
From the second equation we get that cheeseburger plus fries-squared is five. Subtracting cheeseburger, which is six, from both sides, we get that fries-squared is negative-one. Math fans will know that there are two solutions to this; either fries are the "imaginary unit" 𝒾 or they are its negative, -𝒾. We'll do the rest of the problem with 𝒾, keeping in mind that at the end we should also take the complex conjugates as solutions.
Finally, we have that cup to the power of fries, minus cup, equals three. Replacing fries with 𝒾, and moving a cup to the other side, we get that cup-to-the-𝒾 is equal to cup-plus-three.
Now, the weird part about this is the cup-to-the-i. The problem with this is that complex exponentiation is technically not a thing. That is to say, there is no one function which is mathematically equal to "input-to-the-power-of-𝒾". In fact, there are infinitely many such functions.
Fortunately, due to reasons that take about six pages to explain (trust me I've done it), there is one particular function that many people have agreed is "the most reasonable one". This is not a mathematical notion, but a human preference. Seeing as this question was presumably written by a human, I am comfortable with using this function.
So, what function is this? Well, given a complex number r∠θ written in polar form (if you don't know what that means don't worry), where -π < θ ≤ π, then (r∠θ)^𝒾 = e^(-θ)∠ln(r).
Applying this to our problem a value r∠θ will be a possible solution for cup if e^(-θ)∠ln(r) = r∠θ + 3. Splitting this into real and imaginary parts, we get two equations: e^(-θ) cos(ln(r)) = r cos(θ) + 3 and e^(-θ) sin(ln(r)) = r sin(θ). We can graph these equations on Desmos:
The possible values of cup are the intersections between the red, green, and purple. There are infinitely many of these which have an angle of around -π/3, and there are two weirdos: One which is a complex number very close to -2.98, and one which is somewhere around -25. The possible values for cup are all of these infinitely many solutions, and also all of their complex conjugates.
They were right, 99% of people can't solve it.
i've actually been working on some formulae to give all possible solutions to complex exponentiation problems recently, so here's my take on this:
let the value of the glass = z, for z ∈ ℂ:
z^(±i) = 3+z
let z = r·e^(iθ) for r,θ ∈ ℝ, -π < θ ≤ π
∴ z = r·e^i(θ+2πn) for all n ∈ ℤ
∴ (r·e^i(θ+2πn))^(±i) = 3+r·e^i(θ+2πn)
distribute powers (apologies for the use of ∓):
r^(±i)·e^(∓(θ+2πn)) = 3+r·e^i(θ+2πn)
convert to the same base:
e^i(±ln(r))·e^(∓(θ+2πn)) = 3+r·e^i(θ+2πn)
split into real and imaginary components:
re: cos(±ln(r))·e^(∓(θ+2πn)) = 3+r·cos(θ)
im: sin(±ln(r))·e^(∓(θ+2πn)) = r·sin(θ)
in effect, all this changes is the restriction on the domain of theta to be between -pi and pi, so you can just ignore that constraint.
I am here for feminist sex

Anya is live and ready to show you everything. Watch her strip, dance, and perform exclusive shows just for you. Interact in real-time and make your fantasies come true.
Free to watch • No registration required • HD streaming
think again motherfucker
turns your wolf link into a spirit tracks wolfos

Anya is live and ready to show you everything. Watch her strip, dance, and perform exclusive shows just for you. Interact in real-time and make your fantasies come true.
Free to watch • No registration required • HD streaming
ouuuughhh