IM2 - Quadratic Forms

Parabola Features

Forms of Quadratics

Converting Between Forms

Quadratics in Context

Writing Equations for Parabolas

100

Determine the y-intercept of the parabola:

(0,-8)

100

Which form would you use to find a parabola's y-intercept?

Determine the y-intercept of the parabola:

Standard Form

(0,32)

100

Convert the quadratic equation from Factored Form to Standard Form:

y=(x+5)(2x-1)

y=2x^2+9x-5

100

Nathaniel launches a toy rocket from a platform. The graph below shows the height of the rocket h in feet after t seconds. What is the rocket’s greatest height?

441 feet

100

What is the "a" value for this parabola?

a = -2

200

Determine the vertex of the parabola:

(1,-9)

200

Which form would you use to find a parabola's vertex?

Determine the vertex of the parabola:

Vertex Form!

(2,36)

200

Convert the quadratic equation from Standard Form to Factored Form:

y=x^2-3x-10

y=(x-5)(x+2)

200

Nathaniel launches a toy rocket from a platform. The graph below shows the height of the rocket h in feet after t seconds. What height was the rocket launched from?

416 feet

200

Identify the vertex and x-intercepts of this parabola:

Vertex: (-3,8)
x-intercepts: (-5,0) and (-1,0)

300

Determine the x-intercepts of the parabola:

(-2,0) and (4,0)

300

Which form would you use to find a parabola's x-intercepts?

Determine the x-intercepts of the parabola:

Factored Form!

(-4,0) and (8,0)

300

Convert the quadratic equation from Vertex Form to Standard Form:

y=-2(x-3)^2+10

y=-2x^2+12x-8

300

Nathaniel launches a toy rocket from a platform. The graph below shows the height of the rocket h in feet after t seconds. How long was the rocket in the air for?

6.5 seconds

300

Write an equation for this parabola in VERTEX FORM:

y=-2(x+3)^2+8

400

Determine the axis of symmetry of the parabola:

x = 1

400

Does this parabola open upwards or downwards?

Which form shows you?

DOWNWARDS

You can tell from any form!

400

Convert the quadratic equation from Factored Form to Standard Form:

y=7(x-1)(x+3)

7x^2+14x-21

400

Nathaniel launches a toy rocket from a platform. The graph below shows the height of the rocket h in feet after t seconds. After how many seconds did the rocket reach its maximum height?

1.25 seconds

400

Write an equation for this parabola in FACTORED FORM:

y=-2(x+5)(x+1)

500

Determine the minimum of the parabola:

-9

500

Does this parabola have a maximum or minimum?

Determine the maximum or minimum.

MAXIMUM.

The maximum is 36.

We'd use Vertex Form!

500

Convert the quadratic equation from Vertex Form to Factored Form:

y=(x+1)^2-9

y=(x-2)(x+4)

500

Nathaniel launches a toy rocket from a platform. The graph below shows the height of the rocket h in feet after t seconds. For how many seconds was the rocket's height decreasing?

5.25 seconds (from 1.25 to 6.5 seconds)

500

Write an equation for this parabola in STANDARD FORM:

y=-2x^2-12x-10