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- เผยแพร่เมื่อ 26 ก.ย. 2024
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A Nice Algebra Problem | Exponential Equations | Olympiad Prep
Delve into the fascinating world of exponential equations with us as we master an intriguing problem crucial for Math Olympiad preparation. Step-by-step, we unravel the complexities, providing insights and techniques to tackle similar challenges with confidence. Perfect for students aiming to excel in math competitions or anyone eager to enhance their problem-solving skills. Watch now and elevate your understanding of exponential equations! Don't forget to like, comment, and subscribe for more math tips and Olympiad prep strategies.
Topics covered:
Algebra Problem
Exponential equation
How to solve exponential equations?
Olympiad
Algebra
Remainder theorem
Algebraic identities
Algebraic manipulations
Exponent laws
Math Olympiad
Math Olympiad Preparation
#matholympiad #mathpreparation #exponentialequations #problemsolving #mathskills #mathchallenge #olympiad #mathematics #education #algebra
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Super wonderful introduction..thanks Sir 🙏.....x=3
3
We assume x is real. The given expression simplifies to 3^(3x^3-9x-54) = 1. Thus, 3x^3-9x-54=0 > x^3-3x-18=0 > x=3 or x^2+3x+6=0. The latter has no real roots. Therefore, x=3.
One real solution x=3 and two complex one, x=(3+or-sqrt19)/2
X=3
Στο συνολο R, μια ριζα χ=3
Ευχαριστω