Math Olympiad Exponential Solution- (8^𝑥−2^𝑥)/ (6^𝑥−3^𝑥) =2

The Math Olympiad equation (8^𝑥−2^𝑥)/ (6^𝑥−3^𝑥) =2 presents a fascinating challenge in algebraic manipulation and problem-solving. In this equation, the task is to determine the value of $x$ that satisfies the equation. Through careful application of mathematical principles and techniques, such as exponent rules, factoring, and algebraic manipulation, one can unravel the solution to this intriguing problem. Let’s embark on this mathematical journey and uncover the secrets hidden within this equation.

This equation is often used in math Olympiads. We have to figure out the bases before we can simplify the exponents. The next step is to remove all of the equation’s common terms and elements. Finally, we need to reorder the elements and compute the natural logarithm of each side in order to find the value of x. Now let’s watch our video.

You can learn more math Olympiad math techniques through this link- math Olympiad exponent solution.

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