logbxc

Log_b(xc) denotes the logarithm of the product xc with base b, often written log_b(xc). It is the real number y such that b^y = xc. For a real-valued logarithm, the base b must be a positive real number not equal to 1, and the argument xc must be positive.

The domain of log_b(xc) in the real numbers is defined by xc > 0, with x and c

Key properties include the additive rule log_b(xc) = log_b x + log_b c, valid whenever x > 0 and

Example: with base b = 10, x = 20 and c = 5, log_10(xc) = log_10(100) = 2, which equals log_10

Log_b(xc) is a standard tool in algebra for simplifying products inside logarithms and is frequently used in

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