Quadratics Review

y = x2

Quadratics ReviewThis graph

opens upwardsy = x2

Quadratics Review

y = x2

y = -x2

This graph opens downwards

Quadratics Review

y = x2

Quadratics Review

y = x2 y = 3x2

Quadratics Review

y = x2 y = 3x2 y = ¼ x2

Quadratics Review

Projectile Motion

Graphing and manipulating

linear and quadratic functions.

Setting up our equations:

Setting up our equations:

• In general, we take our initial x-position as x = 0

Setting up our equations:

• In general, we take our initial x-position as x = 0

• And we take GROUND LEVEL as y = 0

Setting up our equations:

• In general, we take our initial x-position as x = 0

• And we take GROUND LEVEL as y = 0

• This means that our initial y-position is often not zero!

Setting up our equations:

Initial height above ground level

Setting up our equations:

Initial height above ground level

Horizontal velocity component is constant!

Setting up our equations:

Initial height above ground level

Horizontal velocity component is constant!

Vertical velocity affected by gravity (32 ft/sec2)

Our Equations of Motion:

• In the horizontal direction:

Our Equations of Motion:

• In the horizontal direction:

x = vx t

Our Equations of Motion:

• In the horizontal direction:

x = vx t

Horizontal distance traveled

Our Equations of Motion:

• In the horizontal direction:

x = vx t

Horizontal distance traveled Horizontal velocity

Our Equations of Motion:

• In the horizontal direction:

x = vx t

Horizontal distance traveled Horizontal velocity

Time

Our Equations of Motion:

• In the vertical direction

y = -16 t2 + v0yt +y0

Our Equations of Motion:

• In the vertical direction

y = -16 t2 + v0yt +y0

Vertical position at time t

Acceleration due to gravity

Our Equations of Motion:

• In the vertical direction

y = -16 t2 + v0yt +y0

Vertical position at time t

Acceleration due to gravity

Our Equations of Motion:

• In the vertical direction

y = -16 t2 + v0yt +y0

Vertical position at time tInitial vertical velocity

Acceleration due to gravity

Our Equations of Motion:

• In the vertical direction

y = -16 t2 + v0yt +y0

Vertical position at time tInitial vertical velocity

Initial height

Acceleration due to gravity

Our Equations of Motion:

• In the vertical direction

y = -16 t2 + v0yt +y0

Vertical position at time tInitial vertical velocity

Initial height

Time

Our Equations of Motion:

• In the horizontal direction

• In the vertical direction

• Because both x and y are defined in terms of another parameter, t, we call thesePARAMETRIC EQUATIONS

y = -16 t2 + v0yt +y0

x = vx t