Quadratic Formula - Wikipedia

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Not to be confused with quadratic function or quadratic equation.

In elementary algebra, the quadratic formula is a closed-form expression describing the solutions of a quadratic equation. Other ways of solving quadratic equations, such as completing the square, yield the same solutions.

A graph of a parabola-shaped function which intersects the x-axis at x = 1 and x = 5
The roots of the quadratic function y = 1/2x2 − 3x + 5/2 are the places where the graph intersects the x-axis, the values x = 1 and x = 5. They can be found via the quadratic formula.

Given a general quadratic equation of the form a x 2 + b x + c = 0 {\displaystyle \textstyle ax^{2}+bx+c=0} , with x {\displaystyle x} representing an unknown, and coefficients a {\displaystyle a} , b {\displaystyle b} , and c {\displaystyle c} representing known real or complex numbers with a ≠ 0 {\displaystyle a\neq 0} , the values of x {\displaystyle x} satisfying the equation, called the roots or zeros, can be found using the quadratic formula,

x = − b ± b 2 − 4 a c 2 a , {\displaystyle x={\frac {-b\pm {\sqrt {b^{2}-4ac}}}{2a}},}

where the plus–minus symbol " ± {\displaystyle \pm } " indicates that the equation has two roots.[1] Written separately, these are:

x 1 = − b + b 2 − 4 a c 2 a , x 2 = − b − b 2 − 4 a c 2 a . {\displaystyle x_{1}={\frac {-b+{\sqrt {b^{2}-4ac}}}{2a}},\qquad x_{2}={\frac {-b-{\sqrt {b^{2}-4ac}}}{2a}}.}

The quantity Δ = b 2 − 4 a c {\displaystyle \textstyle \Delta =b^{2}-4ac} is known as the discriminant of the quadratic equation.[2] If the coefficients a {\displaystyle a} , b {\displaystyle b} , and c {\displaystyle c} are real numbers then when Δ > 0 {\displaystyle \Delta >0} , the equation has two distinct real roots; when Δ = 0 {\displaystyle \Delta =0} , the equation has one repeated real root; and when Δ < 0 {\displaystyle \Delta <0} , the equation has no real roots but has two distinct complex roots, which are complex conjugates of each other.

Geometrically, the roots represent the x {\displaystyle x} values at which the graph of the quadratic function y = a x 2 + b x + c {\displaystyle \textstyle y=ax^{2}+bx+c} , a parabola, crosses the x {\displaystyle x} -axis: the graph's x {\displaystyle x} -intercepts.[3] The quadratic formula can also be used to identify the parabola's axis of symmetry.[4]

Contents

  • 1 Derivation by completing the square
  • 2 Equivalent formulations
    • 2.1 Square root in the denominator
  • 3 Other derivations
    • 3.1 Completing the square by Śrīdhara's method
    • 3.2 By substitution
    • 3.3 By using algebraic identities
    • 3.4 By Lagrange resolvents
  • 4 Numerical calculation
  • 5 Historical development
  • 6 Geometric significance
  • 7 Dimensional analysis
  • 8 See also
  • 9 Notes
  • 10 References

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