Quadratic Equation Jee Advanced Pyq (1989-2025)

QUADRATIC EQUATION JEE ADVANCED PYQ

What you'll learn

JEE ADVANCED PYQ

EASY METHODS TO SOLVE QUESTION

ALL PYQ COVERED

QUADRATIC EQUATION ADVANCED PRACTICE

Requirements

Everyone

Description

This is literally the ULTIMATE Course on JEE ADVANCED PYQ!!The most important requirement is that you know what a Quadratic equation is. If you know that then you can jump into this course as it cover all JEE ADVANCED PYQ.In this course we cover all PYQ , Questions related to Quadratic Equation.Over Target is "to Cover all Previous Year Question Related to every single topic of Quadratic Equation.If you practice all problems shown in this video you will be conqueror yourself in Quadratic Equation. Note this course has lots of very short videos. If you are trying to learn math then this format can be good because you don't have to spend tons of time on the course every day. Even if you can only spend time doing 1 video a day, that is honestly better than not doing any mathematics. You can learn a lot and because there are so many videos you could do 1 video a day for a very long time. Remember that math can be challenging and time consuming, so if you just do a little bit every day it can make your journey much more enjoyable. I hope you enjoy this course and learn lots of mathematics.

Overview

Section 1: 2021 QUADRATIC JEE ADVANCED PYQ

Lecture 1 2021 QUADRATIC JEE ADVANCED PYQ

Lecture 2 2021 IIT JEE ADVANCED PYQ || For x∈R, the number of real roots of the equation 3

Section 2: 2020 QUADRATIC JEE ADVANCED PYQ

Lecture 3 2020 IIT JEE ADVANCED PYQ || Suppose a,b denote the distinct real roots of the q

Section 3: 2017 QUADRATIC JEE ADVANCED PYQ

Lecture 4 2017 IIT JEE ADVANCED PYQ || Let p, q be integers and let α, β be the roots of t

Section 4: 2017 QUADRATIC JEE ADVANCED PYQ

Lecture 5 2017 IIT JEE ADVANCED PYQ || Let p, q be integers and let α, β be the roots of t

Section 5: 2016 QUADRATIC JEE ADVANCED PYQ

Lecture 6 Let − π/6 θ π/12. Suppose α1 and β1 are the roots of the equation x2 − 2xsecθ

Section 6: 2015 QUADRATIC JEE ADVANCED PYQ

Lecture 7 Let S be the set of all non-zero real numbers α such that the quadratic equation

Section 7: 2018 QUADRATIC JEE ADVANCED PYQ

Lecture 8 Let a, b, c be three non-zero real numbers such that the equation √(3)acosx+2 b

Section 8: 2022 QUADRATIC JEE ADVANCED PYQ

Lecture 9 The product of all positive real values of x satisfying the equation x ^( 16 (

Section 9: 2014 QUADRATIC JEE ADVANCED PYQ

Lecture 10 The quadratic equation p(x) = 0 with real coefficients has purely imaginary root

Section 10: 2012 QUADRATIC JEE ADVANCED PYQ

Lecture 11 Let α(a) and β(a) be the roots of the equation (3√1 + a -1)x2 + (√1 + a - 1)x +

Section 11: 2019 QUADRATIC JEE ADVANCED PYQ

Lecture 12 Let α and β be the roots of x2 – x – 1 = 0, with α greater than β. For all posit

Lecture 13 Let α and β be the roots of x2 – x – 1 = 0, with α greater than β. For all posit

Lecture 14 Let α and β be the roots of x2 – x – 1 = 0, with α greater than β. For all posit

Lecture 15 Let α and β be the roots of x2 – x – 1 = 0, with α greater than β. For all posit

Section 12: 2013 QUADRATIC JEE ADVANCED PYQ

Lecture 16 IIT JEE ADVANCED PYQ || If 3^x = 4^(x-1) , then x= IIT JEE ADVANCED 2013

Section 13: 1989 QUADRATIC JEE ADVANCED PYQ

Lecture 17 1989 IIT JEE ADVANCED PYQ || Let a,b,c be real numbers, a ≠ 0. If α is a root of

Section 14: 2011 QUADRATIC JEE ADVANCED PYQ

Lecture 18 2011 IIT JEE ADVANCED PYQ || Let (Xo,Yo) be the solution of the following Equati

Lecture 19 2011 IIT JEE ADVANCED PYQ || For which value of b, equation x2 + bx - 1 = 0 and

IIT JEE ADVANCED ASPIRANT