\( 7 ^ { \lg x } - 5 ^ { \lg x + 1 } = 3 \cdot 5 ^ { \lg x - 1 } - 13 \cdot 7 ^ { \lg x - 1 } \)
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To help you understand the equation better, let's transform it using the properties of logarithms and exponents! Notice that \( a^{\lg b} = b^{\lg a} \). So, you can rewrite \( 7^{\lg x} \) as \( x^{\lg 7} \) and \( 5^{\lg x} \) as \( x^{\lg 5} \). Then, simplify the equation step by step—this often helps in revealing clearer relationships between the variables! Next up, solving such equations can be tricky, so watch out for common mistakes like misapplying the properties of logarithms or forgetting to handle negative signs properly. Always double-check each transformation! It's also helpful to isolate terms and simplify them gradually. After you get used to it, you might find it easier to spot patterns or factor terms, leading to a solution faster!
