To solve this inequality, we need to use the properties of logarithms.
First, we can rewrite the inequality using the properties of logarithms:
log2((3x+2)/(1-2x)) > 2
Next, we can rewrite the inequality as an exponential equation:
(3x+2)/(1-2x) > 2^2
(3x+2)/(1-2x) > 4
Now, we can solve for x:
3x + 2 > 4(1-2x)
3x + 2 > 4 - 8x
11x < 2
x < 2/11
Therefore, the solution to the inequality log2(3x+2)-log2(1-2x) > 2 is x < 2/11.
To solve this inequality, we need to use the properties of logarithms.
First, we can rewrite the inequality using the properties of logarithms:
log2((3x+2)/(1-2x)) > 2
Next, we can rewrite the inequality as an exponential equation:
(3x+2)/(1-2x) > 2^2
(3x+2)/(1-2x) > 4
Now, we can solve for x:
3x + 2 > 4(1-2x)
3x + 2 > 4 - 8x
11x < 2
x < 2/11
Therefore, the solution to the inequality log2(3x+2)-log2(1-2x) > 2 is x < 2/11.