Solutions of Quadratic Equation In One Variable from Mathematics Class - 10 Chhattisgarh Board
Chhattisgarh Board Mathematics Solutions from Chapter 3 - Quadratic Equation in One Variable
The detailed solutions to all the exercises of Quadratic Equation In One Variable from Mathematics Class - 10 Chhattisgarh Board for 10th Chhattisgarh Board are provided here. The topics covered are such as Roots Of Quadratic Equation, Discriminant Of Quadratic Equation and, Nature Of Roots Of Quadratic Equation. Students can practice frequently asked questions from this chapter.
Practice Other Topics from Quadratic Equation in One Variable
This topic introduces the concept of quadratic equation in one variable. The concept is explained through a solved example.
This topic explains the roots of quadratic equations. It also states that zeroes of the polynomial are roots of the equation made by its factors.
This topic helps us determine whether the given values are roots of polynomial or not. When we put a value in an equation and both sides of the equation become equal, then these values are the roots of the equation, otherwise, they are not.
This topic explains the methods of solving quadratic equations. The methods are explained through solved examples.
This topic explains the factorization method of solving quadratic equations. Several solved examples are provided for better understanding.
This topic explores the applications of quadratic equations. It provides some examples from our daily life where we can form quadratic equations and find their solutions.
This topic provides the formula to solve quadratic equations. The formula is derived in a step-by-step manner for easy understanding.
This topic discusses the discriminant of the quadratic equation. The discriminant discriminates between the two values of the quadratic equation. If it is zero, then both values are equal.
This topic provides insight into the nature of the roots of quadratic equations. The discriminant can be zero, negative, or positive. It discusses different cases where D is greater, lesser, or equal to zero.
This topic provides some examples of identifying the nature of roots of quadratic equations. The concepts are explained clearly for better understanding.
This topic explains the method of finding unknown constant coefficients. Based on the nature of the roots of a quadratic equation, we can find the value of the unknown coefficient of the variable term.
This topic describes the relation between roots and coefficients of quadratic equations. The concept is made clear through solved examples.
This topic explains how to form quadratic equations if roots are known. We can form quadratic equations using the sum of roots and the product of roots.
