Final answer:
To find x given log(x) = 5.6, rewrite the equation as 10^5.6 = x, resulting in the value of x to be approximately 3981071.7.
Step-by-step explanation:
To find the value of x when you are given that log(x) = 5.6, you need to understand that the logarithm function is the inverse of exponentiation. This means that if logb(x) = y, then by definition by = x. When no base is specified, as in log(x), it is commonly understood to be base 10, or the common logarithm.
Thus, in this case, we can rewrite the equation as 105.6 = x. When you calculate 10 raised to the power of 5.6, you get the value of x. Therefore:
Calculating this value yields x ≈ 3981071.7.