Remember, the rate of change is a rate that describes how one quantity changes in relation to another. If we were given a table, the rate of change would be described as followed:

If we were given a graph, then the rate of change would be the slope of the line in the graph. It could be calculated by using the formula:

For this situation, we have an initial value and a rate of change. 

The initial value is what Megan started with in her savings account: 

The rate of change is how her savings account changes each month. Each month her parents add ; thus, her savings account changes by  each month.

The initial value is what Megan started with in her savings account: 

The rate of change is how her savings account changes each month. Each month her parents add ; thus, her savings account changes by  each month.

A function is represented by an equation. When making our equation, we need to know the rate of change, or the slope, and the y-intercept, which is the initial value or starting point.

Remember, the rate of change is a rate that describes how one quantity changes in relation to another. If we were given a table, the rate of change would be described as followed:

If we were given a graph, then the rate of change would be the slope of the line in the graph. It could be calculated by using the formula:

For this situation, we have an initial value and a rate of change. 

The initial value is what Megan started with in her savings account: 

The rate of change is how her savings account changes each month. Each month her parents add ; thus, her savings account changes by  each month.

Our equation will be in slope intercept form:

We know that the slope is the rate of change, which in this case is  and the y-intercept is the initial value, which in this case is  We can plug in our known values to create our equation as follows:

The initial value is the weight that Tim started at: 

The rate of change is how much he gained each month. Each month he gained ; thus, his weight changes by  each month.

A function is represented by an equation. When making our equation, we need to know the rate of change, or the slope, and the y-intercept, which is the initial value or starting point.

Remember, the rate of change is a rate that describes how one quantity changes in relation to another. If we were given a table, the rate of change would be described as followed:

If we were given a graph, then the rate of change would be the slope of the line in the graph. It could be calculated by using the formula:

For this situation, we have an initial value and a rate of change. 

The initial value is the weight that Tim started at: 

The rate of change is how much he gained each month. Each month he gained ; thus, his weight changes by  each month.

Our equation will be in slope intercept form:

We know that the slope is the rate of change, which in this case is  and the y-intercept is the initial value, which in this case is  We can plug in our known values to create our equation as follows:

Remember, the rate of change is a rate that describes how one quantity changes in relation to another. If we were given a table, the rate of change would be described as followed:

An input/output table displays sets of ordered pairs. The input column represents the x-values and the output column represents the y-values. We can select two sets of ordered pairs from the table to solve for the rate of change, or slope:

The the rate of change for our table is 

The initial value is the starting place, where the input, or x-value, is . This is also known as the y-intercept. In order to solve for the initial value, we first need to know the rate of change, or the slope. 

An input/output table displays sets of ordered pairs. The input column represents the x-values and the output column represents the y-values. We can select two sets of ordered pairs from the table to solve for the rate of change, or slope:

The the rate of change for our table is .

Now that we have our slope, we can use our known values and solve for the y-intercept, or the initial value.

Remember, the equation of our line will be in slope-intercept form:

Plug in the slope and a set of coordinate points from the table provided in the question:

To solve for  we can subtract  from both sides:

 represents the y-intercept, or initial value; thus, the correct answer is . 

A function is represented by an equation. When making our equation, we need to know the rate of change, or the slope, and the y-intercept, which is the initial value or starting point.

An input/output table displays sets of ordered pairs. The input column represents the x-values and the output column represents the y-values. We can select two sets of ordered pairs from the table to solve for the rate of change, or slope:

The the rate of change for our table is .

Now that we have our slope, we can use our known values and solve for the y-intercept, or the initial value.

Remember, the equation of our line will be in slope-intercept form:

Plug in the slope and a set of coordinate points from the table provided in the question:

To solve for  we can subtract  from both sides:

Now that we have the slope and the y-intercept, we can plug those values in for  and 

The initial value is the starting place, where the input, or x-value, is . This is also known as the y-intercept. In order to solve for the initial value, we first need to know the rate of change, or the slope. 

To find the rate of change, or slope, we can use the following formula: 

In a graph, we need to find two sets of coordinate points in order to solve for the rate of change, or slope. Looking at our graph, let's pick the following points:

We can plug these points into the formula for slope, and solve for the rate of change:

The rate of change, or slope, for the provided graph is . 

*Important note: Any two points selected from the graph of the line will equal a slope of . If you selected two points and did get a value of  for the slope, make sure you select two points that are on the line. 

Now that we have our slope, we can use a set of coordinate points from the line and solve for the y-intercept, or the initial value.

Remember, the equation of our line will be in slope-intercept form:

Plug in the slope and a set of coordinate points from the graph provided in the question:

To solve for  we can subtract  from both sides:

 represents the y-intercept, or initial value; thus, the correct answer is . 

Remember, the rate of change, or slope, is a rate that describes how one quantity changes in relation to another. To find the rate of change, or slope, we can use the following formula: 

In a graph, we need to find two sets of coordinate points in order to solve for the rate of change, or slope. Looking at our graph, let's pick the following points:

We can plug these points into the formula for slope, and solve for the rate of change:

The rate of change, or slope, for the provided graph is . 

*Important note: Any two points selected from the graph of the line will equal a slope of . If you selected two points and did get a value of  for the slope, make sure you select two points that are on the line.