A is correct because each element of the domain must be assigned exactly one image. B is true as many-one mappings allow different domain elements to share a common image. C correctly describes surjective functions where every codomain element is hit by at least one domain element, and D is correct that a mapping both one-one and onto is a bijection. E is false because that condition describes surjectivity; a function in general does not require every codomain element to have a pre-image. Hence A, B, C and D only are correct.
Option A:
Option A omits D and so fails to name bijection explicitly, even though the other statements are true. Because it does not list all correct statements, it is incomplete.
Option B:
Option B leaves out A and therefore does not include the basic definition of a function as a mapping with single-valued images. This omission makes the combination insufficient.
Option C:
Option C drops B and thus ignores the many-one possibility, which is an important non-injective behaviour, even though A, C and D are true. The set is therefore not fully representative.
Option D:
Option D is correct in collecting all accurate statements about functions, surjections and bijections, while excluding E, which confuses general functions with onto functions. It matches the functional concepts tested in NET.
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