For the first sequence, y = 2x + 4, we can find the common difference by subtracting consecutive terms:
1052 - 1049 = 3
1055 - 1052 = 3
1058 - 1055 = 3
Therefore, the common difference is 3.
For the second sequence, a^n = -3 + (n-1)10, we can find the common difference by subtracting consecutive terms:
(-4) - (-15) = 11
7 - (-4) = 11
18 - 7 = 11
Therefore, the common difference is 11.
Arranging them from least to greatest common difference:
Y = 2x + 4: 1049, 1052, 1055, 1058 (common difference = 3)
a^n = -3 + (n-1)10: -15, -4, 7, 18 (common difference = 11)
Arrange the following from least to greatest common difference. (least on the bottom and highest on top)(1 point) y=2x+4
1049,1052,1055,1058
a^n=-3+(n-1)10
-15,-4,7,18
1 answer