you can also just use your brain and skip all those steps.

https://tenor.com/view/feel-me-think-about-it-meme-gif-7715402

<:thinking:726878987837636698> but i want to show it tho

I need to know what the weight limit on a standard fifth wheel or else a semi might drop it's trailer but all I can remember is the mitochondria is the powerhouse of the cell

Sure glad they taught me that instead of how to file my taxes.

the answer is quite simple, just take the derivative of the sample space that you get from dividing the fifth wheel from the square of the natural log of the circumfrence of the mitochondria.

They never taught us how credit actually works but they made damn sure that I never forget the pythagorean theorem

and i still forgot it

the pythagorean theorem???

wat is that

the devil

seems pretty simple to me

a^2 + b^2 = c^2

I just truly hate math

it's used to find the length of one side of a right triangle.

especially geometry

It's the basis upon which trigonometry is founded.

cool story

I r 2 stooped fur skool

Just use slader.com<:thinking:726878987837636698>

@mikeflarkin why would you use the pythagorean theorem when you could use the proof every time. This proof appears in the Book IV of Mathematical Collection by Pappus of Alexandria (ca A.D. 300) [Eves, Pappas]. It generalizes the Pythagorean Theorem in two ways: the triangle ABC is not required to be right-angled and the shapes built on its sides are arbitrary parallelograms instead of squares. Thus build parallelograms CADE and CBFG on sides AC and, respectively, BC. Let DE and FG meet in H and draw AL and BM parallel and equal to HC. Then Area(ABML) = Area(CADE) + Area(CBFG). Indeed, with the sheering transformation already used in proofs #1 and #12, Area(CADE) = Area(CAUH) = Area(SLAR) and also Area(CBFG) = Area(CBVH) = Area(SMBR). Now, just add up what's equal.

<:Nervous_Pepe:797578774531014677>

this is a work smarter not harder situation.

I just got here and ummmm

Kam you sir failed that lesson

<:KEK:795742276549607456>

no this is an actual proof for the Pythagorean theorem

<:Nervous_Pepe:797578774531014677>

what satanic passage did you just write up

I'm not gonna lie my eyes glazed over and I didn't get past word ten

ummmmm, that is information that i cannot give

<:Nervous_Pepe:797578774531014677> <:Nervous_Pepe:797578774531014677> <:Nervous_Pepe:797578774531014677>

Pythagorean Theorem and trigonometry in a nutshell:
if you know the length of two sides of a right triangle, you can find the length of the third side.
Because these lengths are related to eachother, the ratio of one to the other will always be the same for a right triangle with a given secondary angle. Consequently, if you know the side length ratios for a given angle, then you can calculate the lengths of two sides given an angle and the length of one side, or you can find the other two angles given the length of two sides.

yes I know I had to use it in a math class once upon a time, and I told my retarded ass math teacher the same thing. plus the greeks weren't the ones that came up with that, it was the egyptians the greeks just documented it

it is the 17th proof of the theorem

I member when I was gud at mefs

<:Glasses:811047963240824873>

i think there are like 122

im not even kidding

wanna know how you can prove it without that bullshit? the 3,4,5 triangle 🙂

the math teachers that make you do 10 extra steps to get an answer you can get in 3 are the ones that should not teach math