log2X

Log2x, written log2(x) or log base 2 of x, is the logarithm with base 2. It yields the exponent to which 2 must be raised to obtain x, i.e., if y = log2(x) then 2^y = x. The function is defined for all positive x, with domain x > 0. Common values include log2(2) = 1, log2(8) = 3, and log2(0.5) = -1.

Key identities describe how log2 interacts with multiplication, powers, and reciprocals: log2(xy) = log2(x) + log2(y), log2(x^k) = k

The range of log2 is the set of all real numbers, and its graph is a continuously

Applications are common in computer science and information theory. Log2 is used to measure data size and