logaritmoidun

Logaritmoidun is a hypothetical mathematical function defined for positive real numbers by the formula logaritmoidun(x) = ln(x) + arctan(x). The name suggests a fusion of logarithmic growth with the saturating behavior of the arctangent, and the construction is used as a teaching and exploration tool in the study of composite functions.

Analytical properties. For x > 0, logaritmoidun is differentiable with derivative logaritmoidun'(x) = 1/x + 1/(1 + x^2). This derivative

Examples. Values illustrate its behavior: logaritmoidun(1) = ln(1) + arctan(1) = π/4 ≈ 0.7854; logaritmoidun(2) ≈ 0.6931 + 1.1071 ≈ 1.8002; logaritmoidun(0.5)

Generalizations and uses. Variations include logaritmoidun_k(x) = ln(x) + arctan(kx) for k > 0, or replacing arctan with other

See also: natural logarithm, arctangent, concave functions, inverse functions.