This part of ISO 14405 illustrates the use of geometrical tolerancing for dimensions that are not linear sizes toavoid the ambiguity that the use of ? tolerances on these dimensions causes. Both linear and angulardimensions, except size of features of size are covered.
EN ISO 14405-2:2011 Referenced Document
ISO 1101 Geometrical product specifications (GPS) - Geometrical tolerancing - Tolerances of form, orientation, location and run-out
ISO 129-1 Technical product documentation (TPD) — Presentation of dimensions and tolerances — Part 1: General principles — Amendment 1
ISO 13715:2000 Technical drawings - Edges of undefined shape - Vocabulary and indications
ISO 14405-1:2010 Geometrical product specifications (GPS) - Dimensional tolerancing - Part 1: Linear sizes
ISO 14660-1:1999 Geometrical Product Specifications (GPS) - Geometrical features - Part 1: General terms and definitions
ISO 14660-2:1999 Geometrical Product Specifications (GPS) - Geometrical features - Part 2: Extracted median line of a cylinder and a cone, extracted median surface, local size of an extracted feature
ISO 17450-1 Geometrical product specifications (GPS) - General concepts - Part 1: Model for geometrical specification and verification
ISO 17450-2 Geometrical product specifications (GPS) - General concepts - Part 2: Basic tenets, specifications, operators, uncertainties and ambiguities
ISO 2538:1998 Geometrical Product Specifications (GPS) - Series of angles and slopes on prisms
ISO 286-1 Geometrical product specifications (GPS) - ISO code system for tolerances on linear sizes - Part 1: Basis of tolerances, deviations and fits; Technical Corrigendum 1
ISO 8015:2011 Geometrical product specifications (GPS) - Fundamentals - Concepts, principles and rules
EN ISO 14405-2:2011 history
2019EN ISO 14405-2:2019 Geometrical product specifications (GPS) - Dimensional tolerancing - Part 2: Dimensions other than linear or angular sizes
2011EN ISO 14405-2:2011 Geometrical product specifications (GPS) - Dimensional tolerancing - Part 2: Dimensions other than linear sizes