The table and the graph below each show a different relationship between the same two variables, x and y:
A table with two columns and 5 rows is shown. The column head for the left column is x, and the column head for the right column is y. The row entries in the table are 4,120 and 5,150 and 6,180 and 7,210. On the right of this table is a graph. The x-axis values are from 0 to 10 in increments of 2 for each grid line. The y-axis values on the graph are from 0 to 550 in increments of 110 for each grid line. A line passing through the ordered pairs 2, 110 and 4, 220 and 6, 330 and 8, 440 is drawn.
How much more would the value of y be on the graph than its value in the table when x = 12? (1 point)
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The value of y in the table for x = 12 would be 240 (according to the pattern in the table provided).
Looking at the graph, we can see that the line follows a consistent pattern with a slope of 110. Therefore, for each unit increase in x, y increases by 110.
Since we are looking for x = 12, and x = 4 corresponds to y = 220 on the graph, the difference between x = 4 and x = 12 is 8.
Therefore, the difference in y for x = 4 and x = 12 on the graph would be 8 * 110 = 880.
The value of y for x = 4 on the graph is 220.
Therefore, the value of y for x = 12 on the graph would be 220 + 880 = 1100.
The difference between the value of y in the table and on the graph when x = 12 would be:
1100 - 240 = 860
Thus, the correct answer is not provided in the options.