Accelerated Algebra Semester 2 Review

Exponential Functions

Quadratic Functions

Solve by Factoring

Special Cases and Grouping

100

Write in Standard Form

y=(x-5)²-4

y=x²-10x + 21

100

What is the shape of the graph for a quadratic function? (name and description)

Parabola, u-shaped

100

When you factor a quadratic, what does your equation need to be equal to?

zero (zero product property)

100

Factor the trinomial:

x² + 10x + 25

(x + 5)²

200

What is the vertex and roots of this equation?

y=x²-8x+12

Vertex (4,-4)

Roots (6,0) and (2,0)

200

The minimum or maximum of a parabola is located at this point.

The vertex

200

TWO PARTS:

1.) Factor the equation y = x² + 10x + 21

2.) Solve using the zero product property

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

2.) 0 = x + 7 AND 0 = x + 3

x = -7 & -3

200

Find the possible values that could make this a perfect square trinomial, then factor.

x²2 + _______x + 256

x² + (-32)x + 256 -----> (x-16)²

x² + 32x + 256 -----> (x+16)²

300

An object is launched at 19.6 meters per second (m/s) from a 58.8-meter tall platform. The equation for the object's height s at time t seconds after launch is s(t) = –4.9t²+ 19.6t + 58.8, where s is in meters.

How long before the object hits the ground after launch?

-4.9(t² – 4t – 12) = 0

(t – 6)(t + 2) = 0

t = 6 and t = -2

6 seconds

300

What the 2 forms of quadratic equations that we have learned? Give an example of each. What's the third form?

Standard, Factored... Vertex

300

TWO PARTS:

1.) Factor: 8x^2 = 30 + 43x

2.) Solve using the zero product property

1.) 0 = (8x + 5)(x - 6)

2.) x = -5/8 & 6

300

Fill in the blank with the value that would make this a perfect square trinomial, then factor it.

9x^2 + ______x + 25

9x^2 + 30x + 25

(3x + 5)²

400

What is the maximum height of the object? When will it happen?

The maximum height of the object is 78.4. The object reaches its maximum height after 2 sec

400

TWO PARTS:

1.) The solutions for quadratics have many names, what are they and where are they found?

2.) How many solutions can a quadratic function have?

1.) Zeros, roots, solutions, x-intercepts. Found where the parabola crosses the x-axis

2.) 2, 1, 0

400

Name 5 values of c which make the expression factorable:

x² − 3x + c

Examples include: 0, 2, -4, -10, -18

400

Factor by grouping:

-20a⁴c³-14a³c⁵+6a²c⁷

Hint - factor out the GCF first!

-2a²c³(10a-3c²)(a+c²)

500

Factor completely

y=2x³-16x²=24x

y=2x(x-6)(x-2)

500

TWO PARTS:

1.) How can you tell if a parabola will open upwards or downwards?

2.) How can you tell if the parabola will be wide or narrow?

1.) Negative a will result in a downward parabola. Positive a will be upward.

2.) The a value. The absolute value of the a value. A larger absolute will be narrower and smaller absolute will be wider

500

For what 6 values of b is the expression factorable?

x² + bx + 12

13, 8, 7, −13, −8, −7

500

Factor:

8x⁶-76x⁴+36x²

4x²(2x²-1)(x-3)(x+3)