Your friend Sarah invests $2000 in an account when she starts college that pays 6.5% annual interest. How much will be in your friend's account after her graduation in 4 years?

Answer:

The equation that represents a proportional relationship must have this form:

And the graph of a proportional relationship must be a a line that passes thorugh the origin.

Step-by-step explanation:

Since the graph is not attached, I will give you a general explanation about how to solve the exercise.

The equation of a line that passes through  the origin is the following:

Where "m" is the slope of the line.

The proportional relationships have the following form:

Where "k" is the Constant of proportionality.

Therefore, the graph of proportional relationships is a line that passes through the origin.

Therefore the equation that represents a proportional relationship must have this form:

And the graph is a a line that passes thorugh the point

Final answer:

A nonproportional relationship is represented by equations or graphs in which the ratio of the variables does not remain constant, like the equation y = x².

Explanation:

A nonproportional relationship is one in which the ratio between the two variables does not remain constant. In terms of graphs or equations, a nonproportional relationship would not be a straight line when graphed. A simple example is the equation y = x². In this case, as x increases, y increases at a changing rate, not a constant rate, which shows it is nonproportional.

Furthermore, when you graph the equation y = x², it forms a parabola, not a straight line. A straight line would indicate a proportional relationship with a constant ratio, while a curve like a parabola indicates a nonproportional relationship.

Learn more about Nonproportional Relationships here:

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Note: you have not added the image, so I am assuming the quadrilateral MNOP with coordinates M(-4, 0), N(5, -3), P(2, 6) and O(-5, 7). It will anyhow clear your concept as I would explain the concept of reflection over the x-axis.

Step-by-step explanation:

Considering the quadrilateral MNPO with assumed vertices

• M(-4, 0)

• N(5, -3)

• P(2, 6)

• O(-5, 7)

THE RULE OF REFLECTION states that when we tend to reflect a point let say (x, y), across the x-axis, the x-coordinate does not change or transform, but the y-coordinate is changed into its opposite sign i.e. (x,-y).

So, the coordinates of the point in the image after quadrilateral MNPO is reflected over the x-axis will be:

(x, y)                      (x, -y)

M(-4, 0)                     M'(-4, 0)

N(5, -3)                     N'(5, 3)

P(2, 6)                      P'(2, -6)

O(-5, 7)                   O'(-5, -7)

Hope, it will help you clear your concept regarding reflection of an object over the x-axis. Using this understanding, you can solve any other question related to this topic.