Quadratic Equations FULL CHAPTER | Class 11th Maths | Arjuna JEE

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Classth-JEE

50:25 sir in this question if we calculate the p and q
We will get two equations
1). p + q = 2
2). pq = 16
By substituting P in eq 2 we will get a quadratic q² -2q + 16 = 0
And by solving it we will get complex roots given by :-
1+√15i and 1- √15i

Thanks for reading and if correct like
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AnuragSingh-usmy

😃Timestamps
00:00 - Introduction
13:08 - Equations Reducible to Quadratic Equations
20:52 - Relation Between Roots & Coefficients
43:37 - Formation of a Quadratic Equations
51:04 - Finding Non Real Roots
01:11:06 - Newton's Formula
01:30:39 - Common Roots
01:55:14 - Graph of Quadratic Expression
02:21:31 - Formula For Range of Quadratic Expression
02:42:54 - Location of Roots-Case-1
03:00:49 - Location of Roots-Case-2
03:10:07 - Location of Roots-Case-3
03:23:13 - Location of Roots-Case-4
03:41:52 - Location of Roots-Case-5
04:03:13 - Thank You Bachoo!!

Rawat-smuo

⏳ Timestamps
00:00 - Introduction
13:08 - Equations Reducible to Quadratic Equations
20:52 - Relation Between Roots & Coefficients
43:37 - Formation of a Quadratic Equations
51:04 - Finding Non Real Roots
01:11:06 - Newton's Formula
01:30:39 - Common Roots
01:55:14 - Graph of Quadratic Expression
02:21:31 - Formula For Range of Quadratic Expression
02:42:54 - Location of Roots-Case-1
03:00:49 - Location of Roots-Case-2
03:10:07 - Location of Roots-Case-3
03:23:13 - Location of Roots-Case-4
03:41:52 - Location of Roots-Case-5
04:03:13 - Thank You Bachoo!!

adityanarayandubey

Tarun sir is god of mathematics ❤ one of the legend teacher

fitneeskeeda

Chillest maths teacher in universe sir tarun❤

ADITYAKUMAR..

Timestamps

00:00 Introduction
13:08 - Equations Reducible to Quadratic Equations 20:52 - Relation Between Roots & Coefficients
43:37 - Formation of a Quadratic Equations
51:04 Finding Non Real Roots
01:11:06 Newton's Formula - Common Roots
01:30:39
01:55:14 Graph of Quadratic Expression
02:21:31 - Formula For Range Quadratic Expression Location of Roots-Case-1
02:42:54
03:00:49 Location of Roots-Case-2
03:10:07 - Location of Roots-Case-3
03:23:13- Location of Roots-Case-4
03:41:52- Location of Roots-Case-5
04:03:13-Thank You Bachoo!!

headitorsff

never seen a teacher being so chill in maths like tarun

PadhaiLikhai-qzrl

00:00 - Introduction
13:08 - Equations Reducible to Quadratic Equations
20:52 - Relation Between Roots & Coefficients
43:37 - Formation of a Quadratic Equations
51:04 - Finding Non Real Roots
01:11:06 - Newton's Formula
01:30:39 - Common Roots
01:55:14 - Graph of Quadratic Expression
02:21:31 - Formula For Range of Quadratic Expression
02:42:54 - Location of Roots-Case-1
03:00:49 - Location of Roots-Case-2
03:10:07 - Location of Roots-Case-3
03:23:13 - Location of Roots-Case-4
03:41:52 - Location of Roots-Case-5
04:03:13 - Thank You Bachoo!!

Darshan-sg

50:22 Sir the discriminant of this equation is becoming negative, that means, the roots of the equation will be complex roots. Also no no. is possible to satistfy the cond. that p+q=2 and pq=16

ManishKumar-rqoh

3:53:37 The number of real roots of the equation is 0 (zero) 3:57:17 A) 11/3 4:00:00 A) 1.5 + ROOT 3

dreamerkhushi

50:25 Sir in this question, D is negative so the roots are unreal. And we know by the property of complex number, that if two complex numbers (in this case the roots of the equation) are added then its is unreal as iota remains in the sum. But when two unreal roots are multiplied then iota gets reduced to -1 . Thus the product is a real number.

pixelverse

50:22 :-
discriminant of the equation is negative therefore there are no real roots

aasthajash

50:22 Discriminant negative, complex roots i.e p+q will never be 2

anonymousl

i just completed my class 10 boards and i really wanted to prepare for JEE mains soo i started research and i am gonna start my prep now onwards...

manvi_.

Timestamps
00:00 - Introduction
13:08 - Equations Reducible to Quadratic Equations
20:52 - Relation Between Roots & Coefficients
43:37 - Formation of a Quadratic Equations
51:04 - Finding Non Real Roots
01:11:06 - Newton's Formula
01:30:39 - Common Roots
01:55:14 - Graph of Quadratic Expression
02:21:31 - Formula For Range of Quadratic Expression
02:42:54 - Location of Roots-Case-1
03:00:49 - Location of Roots-Case-2
03:10:07 - Location of Roots-Case-3
03:23:13 - Location of Roots-Case-4
03:41:52 - Location of Roots-Case-5
04:03:13 - Thank You Bachoo!!

SakshamSharma-yiwm

TIMESTAMPS :
50:30

sir, the discriminant is negative so the roots should be non real { imaginary } but the sum of the roots { p & q } is positive in the given question .. and also given that p & q are two +ve numbers ..

_an_indian_gamer_

⏳ Timestamps
00:00 - Introduction
13:08 - Equations Reducible to Quadratic Equations
20:52 - Relation Between Roots & Coefficients
43:37 - Formation of a Quadratic Equations
51:04 - Finding Non Real Roots
01:11:06 - Newton's Formula
01:30:39 - Common Roots
01:55:14 - Graph of Quadratic Expression
02:21:31 - Formula For Range of Quadratic Expression
02:42:54 - Location of Roots-Case-1
03:00:49 - Location of Roots-Case-2
03:10:07 - Location of Roots-Case-3
03:23:13 - Location of Roots-Case-4
03:41:52 - Location of Roots-Case-5
04:03:13 - Thank You Bachoo!!

prashantdatarkar

50:52 .
The roots of the equation are complex and by substituting p and q values v vil not get p+q=2
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Yashwanth

Tarun sir has helped me a lot in improving my mathematics hat's off to sir 🙏🙏

dreamiitbombay