(mathematics) | Axiom of Comprehension - An axiom schema of set theory which states:
if P(x) is a property thenx : P is a set. I.e. all the things with some property form a set. Acceptance of this axiom leads to Russell's Paradox which is why Zermelo set theory replaces it with a restricted form. |

Browse

axile placentation

Axilla

Axillar

Axillaries

Axillary

axillary artery

axillary cavity

axillary fossa

axillary node

axillary vein

Axinite

Axinomancy

axiological

axiology

Axiom

Axiom of Choice

**-- Axiom of Comprehension --**

AXIOM*

Axiomatic

Axiomatic Architecture Description Language

axiomatic semantics

axiomatic set theory

axiomatical

Axiomatically

Axis

axis band

Axis cylinder

Axis in peritrochio

Axis of a balance

Axis of a curve

Axis of a lens

Axis of a microscope

Axis of a pyramid

Axilla

Axillar

Axillaries

Axillary

axillary artery

axillary cavity

axillary fossa

axillary node

axillary vein

Axinite

Axinomancy

axiological

axiology

Axiom

Axiom of Choice

AXIOM*

Axiomatic

Axiomatic Architecture Description Language

axiomatic semantics

axiomatic set theory

axiomatical

Axiomatically

Axis

axis band

Axis cylinder

Axis in peritrochio

Axis of a balance

Axis of a curve

Axis of a lens

Axis of a microscope

Axis of a pyramid