China | Can you solve this ? | A Nice Math Olympiad Radical Simplification
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- เผยแพร่เมื่อ 14 ต.ค. 2024
- This is an interesting question with amazing concepts!
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Greetings professor.
Thank you for sharing your knowledge.
You are truly a very intelligent man!
Whew! Tour de force!!
Buried within here is that (1 + √5)/2 is the number PHI, aka, “The Golden Ratio” which does reduce to x^2 - x = 1.
And furthermore phi^n - phi^(n-1) = phi^(n-2)
You can use polynomial division to write x^12 as q(x)(x^2-x-1) +r(x), where r(x) is at most linear. Then the value sought is r evaluated at phi.
((1 + ✓5)/2)^2 = (3 + ✓5)/2
((1 + ✓5)/2)^4 = ((3 + ✓5)/2)^2 = (7 + 3✓5)/2
((1 + ✓5)/2)^6 = ((3 + ✓5)/2)((7 + 3✓5)/2) = (9 + 4✓5)
((1 + ✓5)/2)^12 = (9 + 4✓5)^2 = 161 + 72✓5
The final answer is 144×PHI + 89
Reason is that you en with (PHI^4)^3 which gives you (3PHI + 2)^3
This yields:
27PHI^3 + 54PHI^2 + 36PHI + 8
Which gives in turn:
27(2PHI + 1) + 90PHI + 62
This gives:
54PHI + 27 + 90PHI + 62
And we get
144PHI + 89
Professor use complex method.
cool
تبارك الله عليك
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#naweenraaj
set it equal to x and take the Log.
متابعة من المغرب
i ❤ Mathematics