Algebra 1 review

Functions

Graphing

Equations

Details

Labels

100

These functions add/subtract at a constant rate.

Linear functions

100

A pair of numbers that describes the location of a point on a graph.

Coordinate

100

Write and label the Simple Formula for Linear Functions.

y = mx + b

100

The angle of the steepness of a line.

Slope

100

The shape made by graphing a Quadratic function.

Parabola

200

These functions multiply at a constant rate.

Exponential functions

200

The point where the function begins or touches the y-axis.

Y-intercept

200

Write and label the Simple Formula for Exponential Functions

y = k (a^x)

200

The minimum or maximum point of a parabola.

Vertex

200

The highest point of a parabola when it is concave down.

Maximum (vertex)

300

Any function that grows by the power of two! The growth of these functions adds by two each time.

Quadratic Functions

300

The point(s) where two or more lines cross. This point is also the solution to each line it touches.

Intersection

300

Any coordinate that satisfies an equation or sits on the line of that equation

Solution

300

The growth of a linear function.

Slope

300

The main study of Algebra:

Things that take an input, apply a rule, and produce an output.

Functions

400

These functions model things like population growth, depreciation, and compound interest investments.

Exponential functions

400

The annotation we use to show the slope of a function on a graph.

Slope Triangle

400

Write and Label the Simple Formula for Quadratic Functions

y = x²

400

DAILY DOUBLE

The middle point of a parabola where the curve turns around.

Vertex

400

The central intersection of the axes on a graph.

Origin

500

These functions model things like the path of a basketball shot or homerun hit, a satellite dish, and the Golden Gate Bridge.

Quadratic functions

500

DAILY DOUBLE

The root of a function, or where it touches the x-axis.

X-intercept or Zero

500

The name for a group of equations with the same variables.

System of Equations

500

When a parabola opens upward like a smile it is called...

Concave Up

500

When something is made up of exactly mirrored parts on either side of an imaginary line or axis, it is...

Symmetrical

600

Write a real-life example of each of the three function families.

Linear:

Exponential:

Quadratic:

600

Draw an example of the three common types of Linear slope:

Positive:

Zero:

Negative:

600

Replace an unknown variable with a known value.

Substitute

600

3x + 21 = 11x + 5

The value of x that solves this equation is...

x = 2

600

x = 4

Write a different equation where x = 4.

10x = 40

3x – 2 = 10

x + 1 = 5