Defining the memory function for tension and deformation of linear textile products on the basis of their rheological models
Abstract
Defining the memory function for tension and deformation of linear textile products on the basis of their rheological models On the basis of rheological models for yarn elongation, which have been set out for three different kinds of yarns: 100% wool yarn, yarn count = 21 tex (1 tex = 1 g/ 1000 m), average number of torsion Tm = 646 torsion/m, where CV = 6.78%; 100% cotton yam, yarn count = 10 tex, average number of torsion T(m) = 1020 torsion/m, where CV = 16.7% and yarn in the mix 76% wool/ 24% PES, yam count 12.5 tex, average number of torsion T(m) = 1 080 torsion/m, memory functions have been defined for tension and deformation of linear textile products.
Keywords:
yarn / tension / rheological models / memory functions / linear textile products / deformationSource:
Industria Textila, 2009, 60, 6, 308-312Collections
Institution/Community
Inovacioni centarTY - JOUR AU - Stojilković, Dragan T. AU - Đurović Petrović, Maja AU - Petrović, Vasilije AU - Ujević, Darko PY - 2009 UR - https://machinery.mas.bg.ac.rs/handle/123456789/990 AB - Defining the memory function for tension and deformation of linear textile products on the basis of their rheological models On the basis of rheological models for yarn elongation, which have been set out for three different kinds of yarns: 100% wool yarn, yarn count = 21 tex (1 tex = 1 g/ 1000 m), average number of torsion Tm = 646 torsion/m, where CV = 6.78%; 100% cotton yam, yarn count = 10 tex, average number of torsion T(m) = 1020 torsion/m, where CV = 16.7% and yarn in the mix 76% wool/ 24% PES, yam count 12.5 tex, average number of torsion T(m) = 1 080 torsion/m, memory functions have been defined for tension and deformation of linear textile products. T2 - Industria Textila T1 - Defining the memory function for tension and deformation of linear textile products on the basis of their rheological models EP - 312 IS - 6 SP - 308 VL - 60 UR - https://hdl.handle.net/21.15107/rcub_machinery_990 ER -
@article{ author = "Stojilković, Dragan T. and Đurović Petrović, Maja and Petrović, Vasilije and Ujević, Darko", year = "2009", abstract = "Defining the memory function for tension and deformation of linear textile products on the basis of their rheological models On the basis of rheological models for yarn elongation, which have been set out for three different kinds of yarns: 100% wool yarn, yarn count = 21 tex (1 tex = 1 g/ 1000 m), average number of torsion Tm = 646 torsion/m, where CV = 6.78%; 100% cotton yam, yarn count = 10 tex, average number of torsion T(m) = 1020 torsion/m, where CV = 16.7% and yarn in the mix 76% wool/ 24% PES, yam count 12.5 tex, average number of torsion T(m) = 1 080 torsion/m, memory functions have been defined for tension and deformation of linear textile products.", journal = "Industria Textila", title = "Defining the memory function for tension and deformation of linear textile products on the basis of their rheological models", pages = "312-308", number = "6", volume = "60", url = "https://hdl.handle.net/21.15107/rcub_machinery_990" }
Stojilković, D. T., Đurović Petrović, M., Petrović, V.,& Ujević, D.. (2009). Defining the memory function for tension and deformation of linear textile products on the basis of their rheological models. in Industria Textila, 60(6), 308-312. https://hdl.handle.net/21.15107/rcub_machinery_990
Stojilković DT, Đurović Petrović M, Petrović V, Ujević D. Defining the memory function for tension and deformation of linear textile products on the basis of their rheological models. in Industria Textila. 2009;60(6):308-312. https://hdl.handle.net/21.15107/rcub_machinery_990 .
Stojilković, Dragan T., Đurović Petrović, Maja, Petrović, Vasilije, Ujević, Darko, "Defining the memory function for tension and deformation of linear textile products on the basis of their rheological models" in Industria Textila, 60, no. 6 (2009):308-312, https://hdl.handle.net/21.15107/rcub_machinery_990 .