SUMMARY
The logarithmic expression [log_{2} 9/log_{2} 10] - log 3 simplifies to log 3. The key steps involve recognizing that log_{2} 9/log_{2} 10 can be converted to log_{10} 9 using the change of base formula: log_{c} m = logs m / logs c. Subsequently, applying the logarithmic identity log x - log y = log (x/y) leads to the conclusion that log 9 - log 3 equals log (9/3), which simplifies to log 3.
PREREQUISITES
- Understanding of logarithmic identities, specifically log x - log y = log (x/y) and log x + log y = log (x*y).
- Familiarity with the change of base formula for logarithms: log_{c} m = logs m / logs c.
- Basic algebraic manipulation skills to simplify expressions.
- Knowledge of the distinction between equations and expressions in mathematics.
NEXT STEPS
- Study the change of base formula in depth to understand its applications in logarithmic problems.
- Practice simplifying logarithmic expressions using various logarithmic identities.
- Explore advanced logarithmic equations and their solutions for deeper comprehension.
- Review the differences between equations and expressions to enhance mathematical problem-solving skills.
USEFUL FOR
Students studying algebra, particularly those focusing on logarithmic functions, as well as educators looking for examples of logarithmic simplification techniques.