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The fourth of 4 skills relating to logarithms requiresconverting into exponential form because the variableis "inside" the log. Review the conversion: The logarithmic form: These expressions are inverses of one another. Solving Logarithmic Equations The exponential form: 15.63 = k Convert to exponential form: Example: 5 53 = 8k 125 = 8k 3 8 = 8k 8 Solving Logarithmic Equations use algebra to solve +5 +5 Convert to exponential form: 52 = x - 525 = x - 5 30 = x Example: 5 2 = x - 5 Solving Logarithmic Equations use algebra to solve Solve for n. Answer: Round to hundredths (ie. 2.34 or 0.63 or -2.00) Solving Logarithmic Equations Solve for n. Answer: Round to hundredths (ie. 2.34 or 0.63 or -2.00) Solving Logarithmic Equations Solve for n. Answer: Round to hundredths (ie. 2.34 or 0.63 or -2.00) Solving Logarithmic Equations Solve for n. Answer: Round to hundredths (ie. 2.34 or 0.63 or -2.00) Solving Logarithmic Equations Solve for n. Answer: Round to hundredths (ie. 2.34 or 0.63 or -2.00) Solving Logarithmic Equations Solve for n. Answer: Round to hundredths (ie. 2.34 or 0.63 or -2.00) Solving Logarithmic Equations Solve for n. Answer: Round to hundredths (ie. 2.34 or 0.63 or -2.00) Solving Logarithmic Equations Solve for n. Answer: Round to hundredths (ie. 2.34 or 0.63 or -2.00) Solving Logarithmic Equations Solve for n. Answer: Round to hundredths (ie. 2.34 or 0.63 or -2.00) Solving Logarithmic Equations Solve for n. Answer: Round to hundredths (ie. 2.34 or 0.63 or -2.00) Solving Logarithmic Equations |