To solve the inequality, we first simplify the expression 2^(3-6x).
2^(3-6x) = 2^3 2^(-6x) = 8 1/(2^6x) = 8/(64^x)
Now the inequality becomes:
8/(64^x) > 1
This can be rewritten as:
8 > 64^x
Taking the square root of both sides, we get:
2^(3/x) > 8
Simplifying further, we get:
2^(3/x) > 2^3
Therefore, to satisfy the inequality, we must have:
3/x > 3
Dividing by 3 on both sides, we get:
x < 1
Therefore, the solution to the inequality 2^(3-6x) > 1 is x < 1.
To solve the inequality, we first simplify the expression 2^(3-6x).
2^(3-6x) = 2^3 2^(-6x) = 8 1/(2^6x) = 8/(64^x)
Now the inequality becomes:
8/(64^x) > 1
This can be rewritten as:
8 > 64^x
Taking the square root of both sides, we get:
2^(3/x) > 8
Simplifying further, we get:
2^(3/x) > 2^3
Therefore, to satisfy the inequality, we must have:
3/x > 3
Dividing by 3 on both sides, we get:
x < 1
Therefore, the solution to the inequality 2^(3-6x) > 1 is x < 1.