logbxy

Logbxy denotes the logarithm of the product xy with base b, written as log_b(xy). The base b must be a positive real number different from 1, and the argument xy must be positive for real-valued logarithms.

Notation and conventions: The compact form logbxy is a shorthand for log_b(xy). In other contexts the same

Domain and basic limits: For real-valued logarithms, the base satisfies b > 0 and b ≠ 1, and

Key property and caveats: If x > 0 and y > 0, then log_b(xy) = log_b x + log_b y.

Computation: log_b(xy) can be computed as log_b(xy) = ln(xy) / ln(b) = (ln x + ln y) / ln(b), provided x

Examples: log_2(9) ≈ 3.16993, since 9 = 3 × 3 and log_2(9) = log_2 3 + log_2 3. More generally,