Write an explicit formula for the nth term or the sequence 8,-24, 72

Question

asked Dec 5, 2022 222k views

1 Answer

Oscprofessionals · Answer 1 · 2022-12-10T05:08:09+0000

Answer:

T_n =-(8)/(3) (-3)^(n)

Explanation:

Given

Sequence: 8, -24, 72

Required

Determine the n term

The above sequence is geometric. So, we calculate the common ratio first:

r = (T_2)/(T_1)

r = (-24)/(8)

r = -3

The equation is then calculated using:

T_n = ar^(n-1)

Where

a = T_1 = 8

and

r = -3

The equation becomes:

T_n =8 * (-3)^(n-1)

Apply law of indices:

T_n =8 * (-3)^(n) * (-3)^(-1)

T_n =8 * (-3)^(n) * (1)/(-3)

T_n =-8 * (-3)^(n) * (1)/(3)

T_n =-(8)/(3) * (-3)^(n)

T_n =-(8)/(3) (-3)^(n)