To solve this equation, we can start by simplifying the left side:
lg(10x) lg(0.1x) = lg(10x 0.1x) = lg(x)
Now, we can simplify the right side:
lg(x^3) - 3 = 3lg(x) - 3
Now, we can set the left and right sides equal to each other:
3lg(x) - 3 = lg(x)
Subtract lg(x) from both sides:
2lg(x) - 3 = 0
Add 3 to both sides:
2lg(x) = 3
Divide by 2:
lg(x) = 3/2
Now, we can rewrite this in exponential form:
x = 10^(3/2)
x = 1000^0.5
x = 1000^1/2
x = √1000
x = 10√10
Therefore, the solution to the equation lg(10x) * lg(0.1x) = lg(x^3) - 3 is x = 10√10.
To solve this equation, we can start by simplifying the left side:
lg(10x) lg(0.1x) = lg(10x 0.1x) = lg(x)
Now, we can simplify the right side:
lg(x^3) - 3 = 3lg(x) - 3
Now, we can set the left and right sides equal to each other:
3lg(x) - 3 = lg(x)
Subtract lg(x) from both sides:
2lg(x) - 3 = 0
Add 3 to both sides:
2lg(x) = 3
Divide by 2:
lg(x) = 3/2
Now, we can rewrite this in exponential form:
x = 10^(3/2)
x = 1000^0.5
x = 1000^1/2
x = √1000
x = 10√10
Therefore, the solution to the equation lg(10x) * lg(0.1x) = lg(x^3) - 3 is x = 10√10.