Access free live classes and tests on the app
Download
+
Unacademy's Blog!
Login Join for Free
avtar
  • ProfileProfile
  • Settings Settings
  • Refer your friendsRefer your friends
  • Sign outSign out
  • Terms & conditions
  • •
  • Privacy policy
  • About
  • •
  • Careers
  • •
  • Blog

© 2023 Sorting Hat Technologies Pvt Ltd

[wp_login_wall media_id="448945" text_before_login="Download JEE Maths Formulas" text_after_login="Download JEE Maths Formulas"]

Trending Topics

  • JEE Main 2024
  • JEE Main Rank Predictor 2024
  • JEE Main Mock Test 2024
  • JEE Main 2024 Admit Card
  • JEE Advanced Syllabus
  • JEE Preparation Books
  • JEE Notes
  • JEE Advanced Toppers
  • JEE Advanced 2022 Question Paper
  • JEE Advanced 2022 Answer Key
  • JEE Main Question Paper
  • JEE Main Answer key 2022
  • JEE Main Paper Analysis 2022
  • JEE Main Result
  • JEE Exam Pattern
  • JEE Main Eligibility
  • JEE College predictor
[wp_login_wall media_id="424566" text_before_login=" Download Previous Year Papers" text_after_login="Download Previous Year Papers"] combat_iitjee

Related links

  • JEE Study Materials
  • CNG Full Form
  • Dimensional Formula of Pressure
  • Reimer Tiemann Reaction
  • Vector Triple Product
  • Swarts Reaction
  • Focal length of Convex Lens
  • Root mean square velocities
  • Fehling’s solution
testseries_iitjee Predict your JEE Rank .
[wp_login_wall media_id="448945" text_before_login="Download JEE Maths Formulas" text_after_login="Download JEE Maths Formulas"]

Trending Topics

  • JEE Main 2024
  • JEE Main Rank Predictor 2024
  • JEE Main Mock Test 2024
  • JEE Main 2024 Admit Card
  • JEE Advanced Syllabus
  • JEE Preparation Books
  • JEE Notes
  • JEE Advanced Toppers
  • JEE Advanced 2022 Question Paper
  • JEE Advanced 2022 Answer Key
  • JEE Main Question Paper
  • JEE Main Answer key 2022
  • JEE Main Paper Analysis 2022
  • JEE Main Result
  • JEE Exam Pattern
  • JEE Main Eligibility
  • JEE College predictor
[wp_login_wall media_id="424566" text_before_login=" Download Previous Year Papers" text_after_login="Download Previous Year Papers"] combat_iitjee

Related links

  • JEE Study Materials
  • CNG Full Form
  • Dimensional Formula of Pressure
  • Reimer Tiemann Reaction
  • Vector Triple Product
  • Swarts Reaction
  • Focal length of Convex Lens
  • Root mean square velocities
  • Fehling’s solution
testseries_iitjee Predict your JEE Rank .
JEE Main 2026 Preparation: Question Papers, Solutions, Mock Tests & Strategy Unacademy » JEE Study Material » Mathematics » Discriminant of Quadratic Equation
[wp_login_wall media_id="448945" text_before_login="Download JEE Maths Formulas" text_after_login="Download JEE Maths Formulas"]

Trending Topics

  • JEE Main 2024
  • JEE Main Rank Predictor 2024
  • JEE Main Mock Test 2024
  • JEE Main 2024 Admit Card
  • JEE Advanced Syllabus
  • JEE Preparation Books
  • JEE Notes
  • JEE Advanced Toppers
  • JEE Advanced 2022 Question Paper
  • JEE Advanced 2022 Answer Key
  • JEE Main Question Paper
  • JEE Main Answer key 2022
  • JEE Main Paper Analysis 2022
  • JEE Main Result
  • JEE Exam Pattern
  • JEE Main Eligibility
  • JEE College predictor
[wp_login_wall media_id="424566" text_before_login=" Download Previous Year Papers" text_after_login="Download Previous Year Papers"] combat_iitjee

Related links

  • JEE Study Materials
  • CNG Full Form
  • Dimensional Formula of Pressure
  • Reimer Tiemann Reaction
  • Vector Triple Product
  • Swarts Reaction
  • Focal length of Convex Lens
  • Root mean square velocities
  • Fehling’s solution
testseries_iitjee Predict your JEE Rank .

Discriminant of Quadratic Equation

In this article, we will learn about discriminants of quadratic equations, the meaning of discriminants of quadratic equations and the nature of the roots of quadratic equation discriminants.

Table of Content
  •  

The discriminant recipe is utilized to track down the number of arrangements that a quadratic condition has. In polynomial math, the discriminant is the name given to the articulation that shows up under the square root (extremist) sign in the quadratic recipe.

Recipe for Discriminant:

The discriminant of a polynomial is a component of its coefficients and is addressed by capital ‘D’ or Delta image (Δ). It shows the idea of the underlying foundations of any quadratic condition where a, b, and c are sane numbers. 

The genuine roots or the quantity of x-blocks is effectively displayed with a quadratic condition. This recipe is utilized to see if the underlying foundations of the quadratic condition are genuine or non-existent.

The Discriminant Formula in the quadratic condition ax² + bx + c = 0 is

△ = b² − 4ac

For what reason is Discriminant Formula Important?

Utilizing the discriminant, the number of foundations of a quadratic condition is not entirely set in stone. A discriminant can be either sure, negative or zero. By knowing the worth of a determinant, the idea of roots is not entirely settled as follows:

  • If the discriminant esteem is positive, the quadratic condition has two genuine and unmistakable arrangements.
  • If the discriminant esteem is zero, the quadratic condition has just a single arrangement or two genuine and equivalent arrangements.
  • If the discriminant esteem is negative, the quadratic condition has no genuine arrangements.

Discriminant Formula for Solving a Quadratic Equation:

Since a quadratic condition has a level of 2, in this way it will have two arrangements. In this way there would be two upsides of the variable x for which the condition is fulfilled. As indicated by the discriminant recipe, a quadratic condition of the structure ax2 + bx + c = 0 has two roots, given by:

x = -(b ±√D)/2a

where D = b² − 4ac

The ± signs demonstrate two unmistakable answers for the situation. In the event that the discriminant emerges to be negative, the given condition has no genuine roots, since a negative number under square root would be treated as non-existent, not a genuine number.

Discriminant Formula for Solving a Quadratic Equation:

Since a quadratic condition has a level of 2, in this way it will have two arrangements. In this way there would be two upsides of the variable x for which the condition is fulfilled. As indicated by the discriminant recipe, a quadratic condition of the structure ax² + bx + c = 0 has two roots, given by:

x = (- b ± √ (b² – 4ac))/2a

where D = b² − 4ac

The ± signs demonstrate two unmistakable answers for the situation. In the event that the discriminant emerges to be negative, the given condition has no genuine roots, since a negative number under square root would be treated as non-existent, not a genuine number.

The quadratic equation is x = (- b ± √ (b² – 4ac))/2a. So, this can be composed as x = (- b ± √ D)/2a. Since the discriminant D is in the square root, we can decide the idea of the roots relying upon whether D is positive, negative, or zero.

Nature of Roots When D > 0

Then the above recipe becomes,

x = (- b ± √ positive number)/2a

also, it gives us two genuine and various roots. Accordingly, the quadratic condition has two genuine and various roots when b² – 4ac > 0.

Nature of Roots When D < 0

Then the above recipe becomes,

x = (- b ± √ negative number)/2a

also, it gives us two complex roots (which are unique) as the square base of a negative number is a perplexing number. Accordingly, the quadratic condition has two complex roots when b² – 4ac < 0.

Note: A quadratic condition can never have one complex root. The complicated roots generally happen two by two. i.e., in the event that a + bi is a root, a – bi is additionally a root.

Nature of Roots When D = 0

Then, at that point, the above recipe becomes,

x = (- b ± √ 0)/2a = – b/2a

furthermore, henceforth the condition has just a single genuine root. Hence, the quadratic condition has just a single genuine root (or two equivalent roots – b/2a and – b/2a) when b2 – 4ac = 0.

Conclusion:

The discriminant is characterized as Δ = b² − 4ac.

This is the articulation under the square root in the quadratic recipe. The discriminant decides the idea of the underlying foundations of a quadratic condition. The word ‘nature’ alludes to the sorts of numbers the roots can be — in particular genuine, level-headed, nonsensical or fanciful. Δ is the Greek image for the letter D.

For a quadratic capacity f(x)=ax²+bx+c, the answers for the situation f(x) = 0 are given by the recipe

X = (−b ± b²−4ac)/2a.

faq

Frequently asked questions

Get answers to the most common queries related to the JEE Examination Preparation.

Find the underlying foundations of the quadratic condition √2 p² + 7p + 5√2 = 0.

Ans: Allow us to find the roots utilizing the figuring technique. ...Read full

Find the value(s) of k if the quadratic condition 3x² + kx + 2 = 0 has equivalent roots.

Ans: The quadratic condition ax² + bx + c = 0 has equivalen...Read full

Find the total and the result of the foundations of the situation (p + 1) x² - 2p + (q + 1) = 0 in wording p and q.

Ans: Contrasting the given condition and ax² + bx + c = 0,...Read full

xamine the idea of the foundations of a quadratic condition 2x² - 8x +3 = 0

Ans : Here, the coefficients are sane. The discriminant D fo...Read full

Find the discriminant of x²  = −2x + 2.

Ans : Given: x²  = â...Read full

Ans: Allow us to find the roots utilizing the figuring technique.

Contrasting the given condition and ap² + bp + c = 0, a = √2, b = 7 and c = 5√2.

Here, ac = (√2) (5√2) = 10 and b = 7.

Two numbers whose total is 7 and whose item is 10 are 2 and 5. Allow us to part the centre term utilizing these numbers.

√2 p2 + 2p + 5p + 5√2 = 0

√2 p (p + √2) + 5 (p + √2) = 0

(p + √2) (√2 p + 5) = 0

p + √2 = 0; √2 p + 5 = 0

p = – √2; p = – 5/√2 (or) – 5√2/2

So, the underlying foundations of the given quadratic condition are – √2 and – 5√2/2.

Ans: The quadratic condition ax² + bx + c = 0 has equivalent roots assuming its discriminant 

b² – 4ac = 0.

Here, a = 3, b = k, and c = 2.

b² – 4ac = 0

k² – 4(3)(2) = 0

k² – 24 = 0

k² = 24

k = ± √24

k = ± 2√6

So, when the given quadratic condition has equivalent roots, k = 2√6 or k = – 2√6.

Ans: Contrasting the given condition and ax² + bx + c = 0,

a = p + 1, b = – 2p, and c = q + 1.

The amount of the roots = – b/a = – (- 2p)/ (p + 1) = 2p/ (p + 1).

The result of the roots = c/a = (q + 1)/ (p + 1).

So, the amount of the roots is 2p/ (p + 1) and the result of the roots is (q + 1)/ (p + 1).

 

Ans : Here, the coefficients are sane. The discriminant D for a given condition will be

 D = b² – 4ac = (- 8)2- 4 x 2 x 3 = 64 – 24 = 40 > 0. 

We can see, the discriminant of the given quadratic condition is positive however not an ideal square. 

Hence, the foundations of a quadratic condition are genuine, inconsistent, and nonsensical.

Ans : Given: x²  = −2x + 2 or, x2 + 2x − 2 = 0

We know, D = b²  − 4ac

Here, a = 1, b = 2, c = −2.

⇒ D = 22 − 4(1) (- 2)

⇒ D = 4 + 8

⇒ D = 12

Trending Topics

  • JEE Main 2024
  • JEE Main Rank Predictor 2024
  • JEE Main Mock Test 2024
  • JEE Main 2024 Admit Card
  • JEE Advanced Syllabus
  • JEE Preparation Books
  • JEE Notes
  • JEE Advanced Toppers
  • JEE Advanced 2022 Question Paper
  • JEE Advanced 2022 Answer Key
  • JEE Main Question Paper
  • JEE Main Answer key 2022
  • JEE Main Paper Analysis 2022
  • JEE Main Result
  • JEE Exam Pattern
  • JEE Main Eligibility
  • JEE College predictor
combat_iitjee

Related links

  • JEE Study Materials
  • CNG Full Form
  • Dimensional Formula of Pressure
  • Reimer Tiemann Reaction
  • Vector Triple Product
  • Swarts Reaction
  • Focal length of Convex Lens
  • Root mean square velocities
  • Fehling’s solution
testseries_iitjee
Predict your JEE Rank
.

Trending Topics

  • JEE Main 2024
  • JEE Main Rank Predictor 2024
  • JEE Main Mock Test 2024
  • JEE Main 2024 Admit Card
  • JEE Advanced Syllabus
  • JEE Preparation Books
  • JEE Notes
  • JEE Advanced Toppers
  • JEE Advanced 2022 Question Paper
  • JEE Advanced 2022 Answer Key
  • JEE Main Question Paper
  • JEE Main Answer key 2022
  • JEE Main Paper Analysis 2022
  • JEE Main Result
  • JEE Exam Pattern
  • JEE Main Eligibility
  • JEE College predictor
combat_iitjee

Related links

  • JEE Study Materials
  • CNG Full Form
  • Dimensional Formula of Pressure
  • Reimer Tiemann Reaction
  • Vector Triple Product
  • Swarts Reaction
  • Focal length of Convex Lens
  • Root mean square velocities
  • Fehling’s solution
testseries_iitjee
Predict your JEE Rank
.
Company Logo

Unacademy is India’s largest online learning platform. Download our apps to start learning


Starting your preparation?

Call us and we will answer all your questions about learning on Unacademy

Call +91 8585858585

Company
About usShikshodayaCareers
we're hiring
BlogsPrivacy PolicyTerms and Conditions
Help & support
User GuidelinesSite MapRefund PolicyTakedown PolicyGrievance Redressal
Products
Learner appLearner appEducator appEducator appParent appParent app
Popular goals
IIT JEEUPSCSSCCSIR UGC NETNEET UG
Trending exams
GATECATCANTA UGC NETBank Exams
Study material
UPSC Study MaterialNEET UG Study MaterialCA Foundation Study MaterialJEE Study MaterialSSC Study Material

© 2026 Sorting Hat Technologies Pvt Ltd

Unacademy's Blog!

Share via

COPY