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JEE Main 2026 Preparation: Question Papers, Solutions, Mock Tests & Strategy Unacademy » JEE Study Material » Mathematics » Formation of Quadratic Equation
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Formation of Quadratic Equation

A degree 2 equation is a quadratic equation if it has the form ax² + bx + c = 0, where a, b, and c are real integers, and a ≠ 0.

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Order ‘2’  algebraic expressions are of a quadratic kind. They fall within the category of higher order equations. The subject demands a lot of practice from young students and is covered extensively in all competitive exams. But what exactly are these equations, and how may we apply them? What methods should you use to solve quadratic equations?

How do quadratic equations work?

The Latin word quadratus, which means “square,” is the source of the word quadratic in the phrase “quadratic equations.” As a result, we refer to equations with a second-degree variable as quadratic equations. They are also referred to as “Equations of degree 2” for this reason.

Formulas for Solving Quadratic Equations and Quadratic Equation Formulas

Students who learn the formulas for solving quadratic equations have the information they need to cope with difficult numerical problems with ease. The general formula for quadratic equations is provided here. It is described as follows:

The value of x is determined by the following equation if the quadratic equation ax2 + bx + c = 0 is true:

Formula for a quadratic equation:

(-b±√b2-4ac)/2a

Simply perform the computations after entering the values for a, b, and c. The discriminant, or D, is the amount included in the square root. Here is an illustration to help you better grasp the steps involved in solving quadratic equations.

Solution: x2 + 2x + 1 = 0.

In light of the fact that a=1, b=2, c=1, and

Discriminant is equal to b2 – 4ac = 4 – 4 = 0.

x =  -2/2 = -1 is the quadratic equation’s solution.

Consequently, x = 1

Quadratic Equation Roots

Many students ponder whether there are multiple solutions to a quadratic equation. Is it possible for an equation to have no genuine solutions? With the concept of the root of a quadratic equation, yes.

The solution or root of a quadratic equation is the value of a variable for which the equation is fulfilled. A polynomial equation’s degree is equal to the number of roots. A quadratic equation therefore has two roots. Let and represent the general roots of the quadratic equation ax2 + bx + c = 0. You may express the formulas for solving quadratic equations as:

The expressions (-b-√b2-4ac)/2a and (-b+√b2-4ac)/2a

Here, a, b, and c are actual, sensible things. As a result, the value or expression (b2 – 4ac) under the square root sign determines the nature of the roots and of the equation ax2 + bx + c = 0. We say this because there is no genuine number that can be the root of a negative number. Consider the quadratic equation x2 = -1. There isn’t a real number with a negative square. There are therefore no real number solutions to this equation.

Equation-solving formulas for quadratic equations

(-b±√b2-4ac)/2a

The discriminant of the quadratic equation ax2 + bx + c = 0 is hence the expression (b2 – 4ac). Its value defines the kind of quadratic equation’s roots.

The Type of Quadratic Equation’s Roots

Let’s review the general formulas for solving quadratic equations, = (-b-√b2-4ac)/2a and = (-b+√b2-4ac)/2a, to better understand the nature of roots of quadratic equation cases.

Case I: b2 – 4ac > 0

The roots of the quadratic equation ax2+bx+c=0 are real and unequal when a, b, and c are real numbers, a 0, and the discriminant is positive.

Case II: b2– 4ac = 0

The roots of the quadratic equation ax2+ bx+ c = 0 are real and equal when a, b, and c are real numbers, a 0, and the discriminant is zero.

Case III: b² – 4ac < 0

The roots of the quadratic equation ax2 + bx + c = 0 are not equal and are not real when a, b, and c are real numbers, a 0, and the discriminant is negative. We refer to the roots in this instance as fictitious.

Case IV: Perfect square and b² – 4ac > 0

The roots of the quadratic equation ax2 + bx + c = 0 are real, rational, and unequal when a, b, and c are real numbers, a 0, and the discriminant is positive and perfect square.

Case V: not a perfect square and b2 – 4ac > 0

The roots of the quadratic equation ax2 + bx + c = 0 are real, irrational, and unequal when a, b, and c are real numbers, a not equal to 0, and the discriminant is positive but not a perfect square.

In this case, a pair of irrational conjugates are formed by the roots and.

Case VI: a or b is irrational and b² – 4ac > 0 is a perfect square

When any one of a or b is irrational but a, b, and c are all real numbers, a 0 and the discriminant is a perfect square, the roots of the quadratic equation ax2 + bx + c = 0 are also irrational.

Conclusion

  • A polynomial with a degree of two is said to be quadratic
  • Two roots are possible for a quadratic polynomial
  • The formula can be used to find a quadratic equation’s roots is −b±√b2−4ac / 2a
  • To determine the nature of the roots, the discriminant, equal to b2 – 4ac, is utilised
  • To obtain the quadratic polynomial, insert the sum and product of the roots into the expression x2 – (sum of roots)x + (product of roots)
  • A quadratic polynomial has a parabola as its graph
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Frequently asked questions

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

What is the quadratic equation's basic form?

Answer :- The quadratic equation is written as ax²...Read full

Which method of solving a quadratic equation is the simplest?

Answer :- Quadratic Equation Solving ...Read full

Explain the quadratic equation using an example.

Answer :- In mathematics, a quadratic equation is one with degree 2, which mea...Read full

Answer :- The quadratic equation is written as ax² + bx + c = 0, where x is the variable, a and b are the coefficients, and c is the constant term. The presence of a non-zero term in the coefficient of x2 (a cannot be 0), which defines a quadratic equation, is the first requirement.

Answer :- Quadratic Equation Solving

  • Put the equal sign with all terms on one side and zero on the other.
  • Factorize it.
  • Each factor should be set to zero.
  • Fix each of these problems.
  • Put your solution into the original equation to make sure.

Answer :- In mathematics, a quadratic equation is one with degree 2, which means that its maximum exponent is 2. A quadratic has the standard form y = ax² + bx + c, where a, b, and c are all numbers and a cannot be zero.

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  • Root mean square velocities
  • Fehling’s solution
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