Russia math Olympiad | Math Olympiad International For Russians

Really maths challenge from you. Thanks

I just solved it in 1 min by putting x = a+ib , BTW I m preparing for iit jee advanced

Really nice problem 😂😂😂

Really nice math problem.

Our Olympiad math problems are not so plain. This one would be OK for 7th grade' regular school lesson, definitely not for Olympiad, unless primary school also takes part.
I've opened list of problems for recent 2024 contest and you know what? There are NO equations to solve at all there. I can translate for you the very first problem targeted for 9th grade. Try to solve it.
Petya and Vasya know only natural numbers not greater than 10^9-4000. Petya counts as "good" ones only such numbers, which can be expressed as abc+ab+bc+ac, where a, b and c - natural numbers, not less that 100. Vasya calls "good" ones only numbers, which can be recorded as xyz-x-y-z, where x, y and z are natural numbers greater than 100. Who of them has more "good" numbers?
That's it. THIS is the level of our Olympiad. Of course, you can simplify the task significantly by renaming Petya and Vasya to Peter and Basil respectively.

X^2 = plus or minus sqrt(2i)
X^2= plus or minus sqrt(-2i)

You are a very good teacher

Simple and tough

❤

Good ❤

X= + -(√2i) also

Nice math solution

Дуже захмарно

12 минут это решать🤯? Вон x/7=7

X^4 - (2i)^2 = 0

Слишком много лишних вычислений в ролике.
x⁴ = -4
x⁴ = 4∙(cos(π + n∙2∙π) + i∙sin(π + n∙2∙π)) - тригонометрическая форма комплексного числа
x = (4 ** ¼)∙(cos((π + n∙2∙π)/4) + i∙sin((π + n∙2∙π)/4)) - максимально удобна для извлечения корней
x = √2∙(cos(π/4 + n∙π/2) + i∙sin(π/4 + n∙π/2)) - 4 корня для n = 0, 1, 2, 3
x = √2∙(±√2/2 ± i∙√2/2)
x = ±1±i

x^4 - (sqrt(2i))^4 = 0 ?

Square root -3

1

143

can you read it your self

X=2i

College level

Bro its hard,the simple solving way in my opinion:
x⁴=-4
x²=2i
x=±√2i