Answer:
See explanation
Step-by-step explanation:
Q1. The graph of given data is attached.
The relationship is directly proportional as the line connecting all points is straight line passing through the origin.
For every 1 unit change in x, the change of y is 16.
Therefore, the equation that represents this line is

If
then
square feet.
Q2. Yes, the relationship shows the direct proportionality as the line connecting all points is straight line passing through the origin (see second attached graph).
For every 1 unit change in x, the change of y is 0.45.
Therefore, the equation of the line is

Q3. Yes, the relationship shows the direct proportionality as the line connecting all points is straight line passing through the origin.
Find the constant of proportionality:
If x = 2, y = 25, then
when x = 1, y = 12.5
so k = 12.5
and the equation of the line is

When
then 
Hence, the cost of 14 tickets is $175
Q4. This table does not show the direct variation because
if x = 500 and y = 40, then
for x = 100, y is 
and for x = 700, y must be
not 50.
Hence, this relationship does not show the direct proportionality between x and y.
Q5. This elationship shows the direct proportionality as the line connecting all points is straight line passing through the origin.
The constant of proportionality is 
The equation of proportionality is 
When
then

This means for $28 you could buy 16 ice cream scoops.
Q6. The line passes through the point (2,61), so the constant of proportionality is

The equation of proportional relationship is

When
then

This means you could buy 9 tickets for $274.50
Q7. The equation which represent proportional relationship should have the equation of the form

Circle all equations in this form:

Q8. A relationship between two variables in which one is a constant multiple of the other. In particular, when one variable changes the other changes in proportion to the first. If y is directly proportional to x, the equation is of the form y = kx (where k is a constant).
This means that the graph of direct variation is always a straight line passing through the origin (because x = 0 and y = 0 satisfy the equation for all k).
Not all lines represent the proportional relationship. Only those, which pass through the origin.