good one
E) (-2)^-n = -2^-n
n = 0
(-2)^-0 = -2^-0
1 = -1
n = 1
(-2)^-1 = -2^-1
-0.5 = -0.5
n = 1 is a solution, so this answer is incorrect
(D) (-2)^n = -2^n
n = 0
(-2)^0 = -2^0
1 = -1
n = 1
(-2)^1 = -2^1
-2 = -2
n = 1 is a solution, so this answer is incorrect
(C) 2^n = (-2)^-n
n = 0
2^0 = (-2)^-0
1 = 1
n = 0 is a solution, so this answer is incorrect
(B) 2^-n = (-2)^n
n = 0
2^-0 = (-2)^0
1 = 1
n = 0 is a solution, so this answer is incorrect
(A) -2^n = (-2)^-n
n = 0
-2^0 = (-2)^-0
-1 = 1
n = 1
-2^1 = (-2)^-1
-2 = -0.5
n = 0
(-2)^-0 = -2^-0
1 = -1
n = 1
(-2)^-1 = -2^-1
-0.5 = -0.5
n = 1 is a solution, so this answer is incorrect
(D) (-2)^n = -2^n
n = 0
(-2)^0 = -2^0
1 = -1
n = 1
(-2)^1 = -2^1
-2 = -2
n = 1 is a solution, so this answer is incorrect
(C) 2^n = (-2)^-n
n = 0
2^0 = (-2)^-0
1 = 1
n = 0 is a solution, so this answer is incorrect
(B) 2^-n = (-2)^n
n = 0
2^-0 = (-2)^0
1 = 1
n = 0 is a solution, so this answer is incorrect
(A) -2^n = (-2)^-n
n = 0
-2^0 = (-2)^-0
-1 = 1
n = 1
-2^1 = (-2)^-1
-2 = -0.5
Median mean and deviation properties
median of a set is greater than the mean, however, the terms below the median must collectively be farther from the median than the terms above the median.