Functions cannot have the same X value (the first number), but they can have the same Y value (the second number). <span>A. {(1,2),(2,3),(3,4),(2,1),(1,0)}
B. {(2,−8),(6,4),(−3,9),(2,0),(−5,3)}
C. {(1,−3),(1,−1),(1,1),(1,3),(1,5)}
D. {(−2,5),(7,5),(−4,0),(3,1),(0,−6)}
Choice A. has two repeating X values [(1,2) and (1,0), (2,3) and (2,1)] Choice B. has one repeating X value [(2, -8) and (2,0)] Choice C. all has a repeating X value (1) Choice D doesn't have any repeating X values.
In short, your answer would be choice D [</span><span>{(−2,5),(7,5),(−4,0),(3,1),(0,−6)}] because it does not have any repeating X values.</span>
Common ratio can be found by dividing the 2nd term by the first r = 48/6 r = 8
an = a1 * r^(n-1) n = term to find = 8 a1 = first number = 6 r = common ratio = 8 now we sub a(8) = 6 * 8^(8-1) a(8) = 6 * 8^7 a(8) = 6 * 2097152 a(8) = 12582912 <==
