Standard and vertex form of the equation of parabola and how it relates to a parabola's graph.

Standard Form Equation

The standard form of a parabola's equation is generally expressed:

y = ax ² + bx + c
- The role of 'a'
  - If a> 0, the parabola opens upwards
  - if a< 0, it opens downwards.
- The axis of symmetry

Vertex Form of Equation
The vertex form of a parabola's equation is generally expressed as :
y= a(x-h)²+k

If |a| > 1, the graph of the parabola widens. This just means that the "U" shape of parabola stretches out sideways .

If |a| < 1, the graph of the graph becomes narrower(The effect is the opposite of |a| > 1).

Practice Problems

Part I

1) What is the graph of the following parabola y = (x–1)² + 1?

Answer

2) What is the graph of the following parabola y = –(x–1)² + 1?

Answer

3) What is the graph of the following parabola y = (x+2)² –3?

Answer

1) What is the vertex of the following parabola:

y = (x + 3)² + 4

Answer

2) Find the vertex of the following parabola:

y = (x - 3)² + 4

Answer

3) What is the vertex of the parabola whose vertex form equation is

y = (x - 2)² - 3

Answer

Part III

1) What is the vertex of a parabola with the following equation:
y= 2(x-3)²+4 ? Does the parabola open upwards or downwards?
Answers

2) If a parabola's equation is y = 3(x+3)² +4, what is its vertex? Which way does it open?
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3) A parabola has the equation y = -22(x - 9)² + 5. What is its vertex? Which way does the parabola open?
Answers

The standard form equation of a parabola is

y = ax² + bx + c

To find the vertex of a parabola from the standard equation, use the following formula

Equation of a Parabola