What are the vertex and range of y = |x 2| âˆ’ 3? (âˆ’2, âˆ’3); âˆ’[infinity] < y < [infinity] (âˆ’2, âˆ’3); âˆ’3 â‰¤ y < [infinity] (0, âˆ’1); âˆ’[infinity] < y < [infinity] (0, âˆ’1); âˆ’3 â‰¤ y < [infinity]

A parabola's vertex is the location where its symmetry line and parabola intersect. The range of values that we are permitted to enter into our function is known as the domain of a function.

What is the definition of vertex form?

A different way to express the equation of a parabola is in its vertex form. A quadratic equation is typically represented as an x 2 + b x + c, which, when graphed, results in a parabola.
Locate a parabola's vertex,
Finding a parabola's vertex Standard Form
Comparing the parabola's equation to the formula y = ax2 + bx + c in standard form is the first step.
Step 2: Apply the formula h = -b/2a to find the vertex's x-coordinate.

Step 3: Substitute x = h in the calculation ax2+ bx + c to obtain the vertex's y-coordinate (k).
The range of values that we are permitted to enter into our function is known as the domain of a function.

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