Hey mathgeniuses, engineer here. I want to make a prank to my math teacher. I want to ask her something that's seemingly easy but it's actually really complicated.
Hey mathgeniuses, engineer here. I want to make a prank to my math teacher...
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>engineer
Are we really surprised?
I know mathgeniuses are infinitely superior to us, engineerplebs
Now please give me an idea to do the prank
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FUCK TELL ME THE ANSWER
14
Not even interesting
>14
prove it
>infantile cartoon
The answer is very clearly less than 3. Retard.
it's a sad time when engineers need help being faggots
you could just build a spice simulation
or EEVblog actually built a grid that was big enough to get a reasonably accurate reading from
Can every plane simply closed curve be partitioned into an inside and outside?
post sauce
Using only chords, divide a circle into equal area pieces with no two pieces congruent.
Ask if every integer greater than two is a sum of two primes.
Every EVEN integer, you mean?
I am far from math genius but you can always say to the teacher "what is half of 12?" she will say 6
but if you write 12 in roman numerals thats x11 , and if you cover the bottom half of x11 you get v11 which is 7 .
Ask your teacher to list the finitely many integral triples [math](a, b, c)[/math] such that [math]a^3 +b^3 =c^3[/math].
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>finitely
If you set [math]a = 0[/math] and [math]b = c[/math], there's infinite amount of triplets.
.9999=1
Monty hall problem
Monty Carlo fallacy
Collatz Conjecture
If they teach calc1/2 just ask Integral sqrt(tan(x)) dx
Seems very innocent
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Airspeed of an unladen swallow.
The volume of your penis
The volume of her vajayjay
The volume of her vajayjay - the volume of your penis.
Then test the hypothesis.
Tbh if you want to flirt with her, don't be a sperg
>Monty hall problem
is it really that hard? It's pretty intuitive, especially when explained in person.
This is a known problem, the prof will likely just shrug it off
we need something that is seemingly easy, like a question that would appear in high school, but actually have that trick that might evade professional eye.
I think there's a problem in math olympiad in 1980s something that was considered very hard albeit so short.
here it is:
Let aa and bb be positive integers such that (1+ab)|(a2+b2)(1+ab)|(a2+b2) . Show that (a2+b2)/(1+ab)(a2+b2)/(1+ab) must be a perfect square.
It's the question from Problem 6, IMO 1988.
ask her if solving an equation with 2 variables is possible
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ayy
kek
Ask if the pythagorean theorem is true if the exponent is 3 or bigger.
i don't get it
too obvious
what is the average distance between two points, randomly placed in a 1 x 1 square? its somthing like 0.52... but it is really fcking difficult. saw it in a yt vid, you can look for it
Ask her how triangles can be real if our number aren't real.