To solve this equation, we will first substitute (y = (3-2x)^2).
This gives us(y^2 - y - 72 = 0)
Now, we can factor this quadratic equation((y - 9)(y + 8) = 0)
Setting each factor equal to zero gives us(y - 9 = 0 \Rightarrow y = 9(y + 8 = 0 \Rightarrow y = -8)
Now, we substitute back in (y = (3-2x)^2)((3-2x)^2 = 9) or ((3-2x)^2 = -8)
Solving these equations gives us((3-2x) = 3) or ((3-2x) = -3(3-2x = 3) or (3-2x = -3(-2x = 0) or (-2x = -6(x = 0) or (x = 3)
Therefore, the solutions to the equation ((3-2x)^4-(3-2x)^2-72=0) are (x = 0) and (x = 3).
To solve this equation, we will first substitute (y = (3-2x)^2).
This gives us
(y^2 - y - 72 = 0)
Now, we can factor this quadratic equation
((y - 9)(y + 8) = 0)
Setting each factor equal to zero gives us
(y - 9 = 0 \Rightarrow y = 9
(y + 8 = 0 \Rightarrow y = -8)
Now, we substitute back in (y = (3-2x)^2)
((3-2x)^2 = 9) or ((3-2x)^2 = -8)
Solving these equations gives us
((3-2x) = 3) or ((3-2x) = -3
(3-2x = 3) or (3-2x = -3
(-2x = 0) or (-2x = -6
(x = 0) or (x = 3)
Therefore, the solutions to the equation ((3-2x)^4-(3-2x)^2-72=0) are (x = 0) and (x = 3).