What are the coordinates of the vertex of the parabola described by the equation below?
[tex]$y=-7(x-4)^2-5$[/tex]
A. (-5,-4)
B. (5,4)
C. (4,-5)
D. (-4,5)
Answer (1)
Recognize the vertex form of a parabola: y = a ( x − h ) 2 + k , where ( h , k ) is the vertex.
Compare the given equation y = − 7 ( x − 4 ) 2 − 5 to the vertex form.
Identify h = 4 and k = − 5 from the equation.
State the vertex coordinates as ( 4 , − 5 ) .
Explanation
Understanding the Equation We are given the equation of a parabola in vertex form: y = − 7 ( x − 4 ) 2 − 5 . We need to identify the coordinates of the vertex.
Vertex Form of a Parabola The general vertex form of a parabola is given by y = a ( x − h ) 2 + k , where ( h , k ) represents the coordinates of the vertex.
Identifying h and k Comparing the given equation y = − 7 ( x − 4 ) 2 − 5 with the general vertex form y = a ( x − h ) 2 + k , we can identify the values of h and k . In this case, h = 4 and k = − 5 .
Finding the Vertex Therefore, the coordinates of the vertex are ( 4 , − 5 ) .
Examples
Understanding parabolas is crucial in various fields, such as physics and engineering. For example, the trajectory of a projectile, like a ball thrown in the air, follows a parabolic path. The vertex of this parabola represents the highest point the ball reaches. Similarly, satellite dishes and reflecting telescopes use parabolic reflectors to focus signals or light onto a single point, which is related to the properties of the parabola's vertex. Knowing how to find the vertex helps in optimizing the design and performance of these systems.
