the data values for three different scatterplots are shown. determine which line or curve would best model…

the data values for three different scatterplots are shown. determine which line or curve would best model each set of data when the data is graphed in a coordinate plane and drag the data to the appropriate column.\nlinear function - positive slope linear function - negative slope quadratic function\nset a: {(5, 14) (6, 18) (7, 29) (8, 38) (9, 55) (10,70)}\nset b: {(5, 2) (6, 5) (7, 6) (8, 8) (9, 10) (10, 11)}\nset c: {(5, 15) (6, 13) (7, 10) (8, 8) (9, 6) (10, 2)}

the data values for three different scatterplots are shown. determine which line or curve would best model each set of data when the data is graphed in a coordinate plane and drag the data to the appropriate column.\nlinear function - positive slope linear function - negative slope quadratic function\nset a: {(5, 14) (6, 18) (7, 29) (8, 38) (9, 55) (10,70)}\nset b: {(5, 2) (6, 5) (7, 6) (8, 8) (9, 10) (10, 11)}\nset c: {(5, 15) (6, 13) (7, 10) (8, 8) (9, 6) (10, 2)}

Answer

Explanation:

Step1: Analyze Set A

As (x) - values increase ((5,6,7,8,9,10)), (y) - values ((14,18,29,38,55,70)) also increase. The relationship appears to be linear with a positive slope.

Step2: Analyze Set B

As (x) - values increase ((5,6,7,8,9,10)), (y) - values ((2,5,6,8,10,11)) increase. The relationship appears to be linear with a positive slope.

Step3: Analyze Set C

As (x) - values increase ((5,6,7,8,9,10)), (y) - values ((15,13,10,8,6,2)) decrease. The relationship appears to be linear with a negative slope.

Answer:

Linear function - positive slope: Set A, Set B Linear function - negative slope: Set C Quadratic function: None of the sets