1. \( \left(2\right. \) балла) \( 2^{2-\mathrm{x}}=32 \) 2. \( \left(2\right. \) балла) \( 81^{\mathrm{x}-4}=\frac{1}{3} \) 3. \( \left(2\right. \) балла) \( \left(\frac{1}{4}\right) 4 \mathrm{x}-13=\frac{1}{64} \) 4. \( \left(3\right. \) балла) \( 5^{\mathrm{x}+2}-5^{\mathrm{x}}=120 \) 5. (3 балла \( \left(4^{\mathrm{x}}-6 \cdot 2^{\mathrm{x}}+8=0\right. \) 6. (3 балла) \( 9^{\mathrm{x}}+3 \cdot 3^{\mathrm{x}}-18=0 \)
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To solve these equations, it's often handy to express them with the same base since most of them involve powers. For instance, \( 32 \) can be rewritten as \( 2^5 \) in the first equation. This creates a basis to equate the exponents directly, making it a breeze to find \( x \). Similarly, \( 81 \) is \( 3^4 \) and \( \frac{1}{3} \) is \( 3^{-1} \), so manipulating these ensures clarity in isolating \( x \). As you tackle these problems, common mistakes can often occur through miscalculations when converting bases or exponents. Always double-check that any logarithmic manipulations maintain the integrity of equations. Don't forget to look out for extraneous solutions, especially in cases where squaring or re-expressing introduces possible false positives. And remember, patience is key—math is as much an art as it is a skill!
