Vertex Formula, Definition, Derivation, Examples

Vertex Formula: The parabola's Vertex Formula serves to determine the coordinates of the point where the parabola intersects its axis of symmetry, known as the vertex, denoted as (h, k). The standard equation for a parabola is represented as y = ax ² + bx + c. When the coefficient of x ² is positive, the vertex is positioned at the lowest point of the U-shaped curve, whereas a negative coefficient places the vertex at the highest point of the U-shaped curve.

The vertex corresponds to the minimum point when the parabola opens upward or the maximum point when it opens downward, marking the turning point where the parabola changes its direction. Exploring the vertex formula further and working through examples will enhance understanding of its application in solving parabolic equations.

What is Vertex Formula

The Vertex Formula is instrumental in determining the coordinates of the vertex for a parabola.

The standard parabolic equation is expressed as y = ax ² + bx + c.

In the vertex form of the parabola, it's represented as y = a(x - h) ² + k.

The vertex coordinates (h, k) can be found using two methods:

(h,k)=(− 2a b ​ ,− 4a D ​ ),

where D (the discriminant) = b ² −4ac (h,k) can be found by setting h=− 2a b ​ and then evaluating y at h to determine the value of k.

Vertex Formula

There are two formulas used to determine the vertex:

Formula 1: (h,k)=(− 2a b ​ ,− 4a D ​ )

Where: D represents the denominator (h,k) are the coordinates of the vertex

Formula 2: x-coordinate of the vertex = − 2a b ​

Derivation of Vertex Formulas

Formula 1:

Formula 2:

Vertex Formula Solved Examples

Example 1: Find the vertex of the parabola represented by the equation y=−2x 2 +8x−5.

Solution: Given equation: y=−2x 2 +8x−5

Coefficients: a=−2, b=8, c=−5

Discriminant: D=b 2 −4ac=( 8) 2 −4(−2)(−5)= 64−40=24

Using the vertex formula (Formula 1):

Vertex, (h,k)=(− 2a b ​ ,− 4a D ​ )

(h,k)=(− 2(−2) 8 ​ ,− 4(−2) 24 ​ )=(−2,3)

Therefore, the vertex of the given parabola is (−2,3).

Example 2: Consider the parabola with the equation y=x 2 +6x+9. Find its vertex.

Solution: Given equation: y=x 2 +6x+9

Coefficients: a=1, b=6, c=9

Discriminant:

D=b 2 −4ac=(6) 2 −4(1)(9)= 36−36=0

Using the vertex formula (Formula 1):

(h,k)=(− 2a b ​ ,− 4a D ​ )

(h,k)=(− 2(1) 6 ​ ,− 4(1) 0 ​ )=(−3,0)

Hence, the vertex of the given parabola is ( − 3 , 0 ) (−3,0).

These examples demonstrate the application of the vertex formula to determine the vertex of different parabolic equations.

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