MX2 PREDICTIONS (Q16, Q15..) (1 Viewer)

[d1zzyohs]

Mechanics again?
Maybe roots of unity with quadratic/cubic/quartic formulas.
Whaddaya guys think?

 

[Epicman69]

Mechanics again?
Maybe roots of unity with quadratic/cubic/quartic formulas.
Whaddaya guys think?

Mechanics again, prolly 5 olympiad questions for Q16, idk prepare for the worst

 

[Run hard@thehsc]

Mechanics again?
Maybe roots of unity with quadratic/cubic/quartic formulas.
Whaddaya guys think?

prolly lol. Tbf mechanics and proofs are likely. Complex idk, but if I remember the q16 of the 2020 HSC had some intergration qs as well

 

[tgone]

They'll give us the trivial proof

prove the following statements:
(i) x^2+y^2 ≥ 2xy for real x, y
(ii) hence, for integers a, b, c and integers n>2, there does not exist a,b,c,n such that a^n+b^n = c^n

 

[Life'sHard]

I have a feelings it’s gonna be a combination of topics for the final q. Chuck a mechanics proof q or smth lol. Pretty much anything is possible.

 

[jklol]

They'll give us the trivial proof

prove the following statements:
(i) x^2+y^2 ≥ 2xy for real x, y
(ii) hence, for integers a, b, c and integers n>2, there does not exist a,b,c,n such that a^n+b^n = c^n

NAHH FRRRRRRRRRRRRRRRRR lmao fermat's last therom type shit.

 

[ExtremelyBoredUser]

They'll give us the trivial proof

prove the following statements:
(i) x^2+y^2 ≥ 2xy for real x, y
(ii) hence, for integers a, b, c and integers n>2, there does not exist a,b,c,n such that a^n+b^n = c^n

whoever gets (ii) gets free state rank + their proof stolen from them

 

[tgone]

whoever gets (ii) gets free state rank + their proof stolen from them

part (i) very important to solve it

 

[yanujw]

The exam authors be looking through the putnam papers for inspiration