State whether the functions represented by graphs A , B , C and ​​ in the figure are even, odd, or neither. <IMAGE>

A function is considered even if its graph is symmetric with respect to the y-axis. Mathematically, this means that for every x in the domain, f(-x) = f(x). Common examples include f(x) = x² and f(x) = cos(x). Identifying even functions involves checking this symmetry visually or through algebraic verification.

A function is classified as odd if its graph is symmetric with respect to the origin. This means that for every x in the domain, f(-x) = -f(x). Examples include f(x) = x³ and f(x) = sin(x). To determine if a function is odd, one can look for this rotational symmetry or apply the algebraic condition.

A function is neither even nor odd if it does not exhibit the symmetry properties of either category. This can occur when the function has terms that do not conform to the even or odd definitions, such as f(x) = x² + x. To classify a function as neither, one must show that it fails both symmetry tests.