Title | On finding the shortest distance of a point from a line: Which method do you prefer? |
Author/s |
Bhalchandra Gore
Centre for Modeling and Simulation, Savitribai Phule Pune University, Pune 411 007 India |
Abstract | The formula for the shortest distance of a point from a line can be derived in several different ways. Some typical methods are taught at the elementary (i.e., high-school and junior college) level. However, solving such "school-book" problems using the advanced mathematical methods is often overlooked and neglected. This article illustrates how this formula can be derived in various ways. Such a comparison will not only encourage the reader to explore and understand how and why do mathematical techniques work, but it will also help understand a common thread between different branches of mathematics. This exercise also shows that "the best way" to solve a mathematical problem is a misnomer. |
Keywords | Mathematics pedagogy, shortest distance, mathematical methods, optimization, Lagrange multiplier |
Download | Journal |
Citing This Document | Bhalchandra Gore , On finding the shortest distance of a point from a line: Which method do you prefer? . Outreach Document CMS-OD-20161102 of the Centre for Modeling and Simulation, Savitribai Phule Pune University, Pune 411007, India (2016); available at http://864230.efsst.group/reports/. |
Notes, Published Reference, Etc. | Published as Resonance 22(7), 705–714, July 2017. |
Contact | bwgore AT 864230.efsst.group |
Supplementary Material |