To solve the equation log₂(x) + 6 = 256 – 4, we will first simplify the right side:
- 256 – 4 = 252.
Now our equation looks like this:
log₂(x) + 6 = 252.
Next, we can isolate log₂(x) by subtracting 6 from both sides:
- log₂(x) = 252 – 6
- log₂(x) = 246
To eliminate the logarithm and solve for x, we will rewrite the equation in exponential form. Remember, the definition of a logarithm states that if:
- log₂(a) = b, then a = 2b.
Applying this to our equation, we get:
x = 2246.
Thus, the solution to the original equation is:
x = 2246.
In conclusion, the solution to the equation log₂(x) + 6 = 256 – 4 is x = 2246.