the graph shows the average price of potatoes per pound starting from january 2014. a student states that…

the graph shows the average price of potatoes per pound starting from january 2014. a student states that the scale of the x - axis indicates that 6 years of data are shown and that moving one tick mark on the y - axis is a change of 5 cents per pound. are the students statements correct? use the drop - down menus to explain.\naverage potato prices\nclick the arrows to choose an answer from each menu.\nthe scale of the x - axis of the graph counts in such a way that 36 on the x - axis represents choose... after january 2014. on the y - axis, moving one tick mark is a change of choose... per pound because the scale counts by choose... of a unit. therefore, choose... correct.

the graph shows the average price of potatoes per pound starting from january 2014. a student states that the scale of the x - axis indicates that 6 years of data are shown and that moving one tick mark on the y - axis is a change of 5 cents per pound. are the students statements correct? use the drop - down menus to explain.\naverage potato prices\nclick the arrows to choose an answer from each menu.\nthe scale of the x - axis of the graph counts in such a way that 36 on the x - axis represents choose... after january 2014. on the y - axis, moving one tick mark is a change of choose... per pound because the scale counts by choose... of a unit. therefore, choose... correct.

Answer

Explanation:

Step1: Analyze x - axis

The x - axis is labeled "Months Since 1/2014". Since 36 months is 3 years. So 36 on the x - axis represents 3 years after January 2014, not 6 years as the student said.

Step2: Analyze y - axis

The y - axis values are 0.65, 0.655, 0.66, 0.665, etc. The difference between consecutive values is 0.005 dollars or 0.5 cents, not 5 cents as the student said.

Answer:

The scale of the x - axis of the graph counts in such a way that 36 on the x - axis represents 3 years after January 2014. On the y - axis, moving one tick mark is a change of 0.5 cents per pound because the scale counts by 0.005 of a unit. Therefore, the student's statements are not correct.