A Mathematical Challenge: Tackling Radical Equations
Вставка
- Опубліковано 18 чер 2024
- A Mathematical Challenge: Tackling Radical Equations
Join us in this exhilarating mathematical journey as we delve into the world of radical equations. In this video, we'll explore strategies and techniques to conquer even the most daunting radical equations, empowering you to excel in your mathematical pursuits. Get ready to sharpen your problem-solving skills and embrace the challenge!
Topics covered:
Algebra
Radical Equation
Substitution
Algebraic identities
Algebraic manipulations
Quadratic equations
Quadratic formula
Math Tutorial
Math Olympiad Preparation
Timestamps:
0:00 Introduction
0:25 Substitution
1:20 Solving system of equations
2:07 Algebraic identities
3:45 Algebraic manipulations
6:25 Quadratic equations
8:29 Quadratic formula
8:50 Real solutions
9:50 Verification
#mathematics #mathchallenge #radicalequations #problemsolving #mathskills #mathematicseducation #matholympiad #mathletes #stem #education #problemsolvingskills #algebra #math
Thanks for Watching!!
Do not forget to like, share and subscribe our channel infyGyan for more mathematical adventures.
@infyGyan
Super wonderful explanation ....x=2,1 ....thanks for sharing.
Thanks for watching
🙏
Arranging the given
by 5th-root term = 3 -x,
and powering of 5,
and rearranging yields
x^4 -6x^3 +18x^2 -27x +14 =0.
By RRT and SDMs
(x -1)(x -2)(x^2 -3x +7) =0,
that is,
x = 1, 2 and two-cmplx sols
Yes I used the same method. It is both the easiest and most straightforwad way to solve this problem.
Plot this using Desmos and you get a "tsunami" shock wave!
X= 2; 1
X=2,1
X=1