Under-determined & Over-determined System
Duration: 6 min
This video lesson is available to enrolled students.
AI Summary
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This linear algebra lecture focuses on classifying systems of linear equations based on the relationship between the number of equations (e) and variables (v). The instructor, Yash Jain from Knowledge Gate, categorizes systems into three distinct types: underdetermined (e < v), exactly determined (e = v), and overdetermined (e > v). Using a whiteboard, he defines these terms, provides algebraic examples, and offers geometric interpretations involving lines in a 2D plane to explain solution existence and uniqueness.
Chapters
0:00 – 2:00 00:00-02:00
The video begins with a title card showing determinant formulas before the instructor introduces the topic "Under determined and over determined System of Equations". He defines 'v' as the number of variables and 'e' as the number of equations, writing 'v -> no. of variables' and 'e -> no. of equations' at the top. He lists three primary cases: e < v results in an underdetermined system where the solution cannot be determined; e = v results in an exactly determined system; and e > v results in an overdetermined system. He writes examples like "1 eq - 2 var" and "2 eq - 3 var" on the board, marking them with an X to indicate they are underdetermined.
2:00 – 5:00 02:00-05:00
The instructor elaborates on the "exactly determined system" where e = v. He writes "V = e" in a box and explains that this system can have a unique solution, no solution, or infinite solutions, writing "[unique sol", "no sol", "oo sol"]" on the board. He draws geometric representations: intersecting lines (X) for a unique solution, parallel lines (=) for no solution, and overlapping lines (-) for infinite solutions. He then shifts to the "overdetermined system" where e > v, writing "3 eq = 2 var" as a specific example and circling "e > v" and "over determined" to emphasize the concept. He draws a diagram of three lines intersecting to show the overdetermined case.
5:00 – 6:04 05:00-06:04
The instructor provides a geometric visualization for the overdetermined case. He writes "3 lines 2D" to represent a system with 3 equations and 2 variables. He circles "2 eq" and "2 var" to show the baseline for a unique intersection point, noting "(x, y) -> 2D plane". Then he circles "3 eq" and "2 var" to show the overdetermined case. He explains that in a 2D plane, three lines generally do not intersect at a single point unless they are concurrent. He emphasizes that for e > v, we can have more than one solution or no solution. This visual aid helps clarify why overdetermined systems often have no solution. The video concludes with a "Thanks for watching" screen.
The lecture systematically builds understanding by first defining the algebraic relationship between equations and variables, then exploring the solution possibilities for each case, and finally grounding these abstract concepts in geometric intuition. By visualizing lines in a 2D plane, the instructor clarifies why systems with more equations than variables (overdetermined) often lack a solution, while systems with equal numbers (exactly determined) can have unique, infinite, or no solutions. This progression from algebra to geometry aids student comprehension of linear systems.