Safe domain for projectile trajectories in a medium with quadratic drag force

  1. Arenas, A. 1
  2. Ciaurri, Ó. 1
  1. 1 Universidad de La Rioja
    info

    Universidad de La Rioja

    Logroño, España

    GRID grid.119021.a

Journal:
Mathematics and Mechanics of Solids

ISSN: 1081-2865

Year of publication: 2016

Volume: 21

Issue: 9

Pages: 1061-1067

Type: Article

Export: RIS
DOI: 10.1177/1081286514550019 SCOPUS: 2-s2.0-84989332825 WoS: 000385372400002 GOOGLE SCHOLAR

Metrics

Cited by

  • Scopus Cited by: 0 (12-06-2021)

Journal Citation Reports

  • Year 2016
  • Journal Impact Factor: 2.953
  • Best Quartile: Q1
  • Area: MECHANICS Quartile: Q1 Rank in area: 13/133 (Ranking edition: SCIE)
  • Area: MATHEMATICS, INTERDISCIPLINARY APPLICATIONS Quartile: Q1 Rank in area: 11/100 (Ranking edition: SCIE)
  • Area: MATERIALS SCIENCE, MULTIDISCIPLINARY Quartile: Q2 Rank in area: 72/275 (Ranking edition: SCIE)

SCImago Journal Rank

  • Year 2016
  • SJR Journal Impact: 1.165
  • Best Quartile: Q1
  • Area: Mathematics (miscellaneous) Quartile: Q1 Rank in area: 69/427
  • Area: Mechanics of Materials Quartile: Q1 Rank in area: 54/502
  • Area: Materials Science (miscellaneous) Quartile: Q1 Rank in area: 89/675

CiteScore

  • Year 2016
  • CiteScore of the Journal : 3.7
  • Area: Mathematics (all) Percentile: 94
  • Area: Mechanics of Materials Percentile: 78
  • Area: Materials Science (all) Percentile: 74

Abstract

In this paper we provide an expression for the border of the safe domain associated with projectile trajectories in a medium with a quadratic drag force. The curve defining the safe domain is given in parametric coordinates involving some integrals. These integrals have to be evaluated numerically after solving an integral equation. We show that not all the trajectories are necessary to obtain the safe domain. © The Author(s) 2014.