what is log x=3.2
is that exactly how it is showed or is there a log base? normally that means theres a log base 10 and if that is the case the answer is 10^3.2. in a more general sense x=b^y and putting it in terms of y the equation is y=logbx were b is subscripted i just don't know how to do that on here. i hope this helps!
To find the value of x in the equation log(x) = 3.2, we need to understand that logarithm is the inverse function of exponentiation.
In this case, the logarithm has a base of 10, which is the common logarithm, denoted as log₁₀.
To solve for x, we can rewrite the equation in exponential form using the definition of logarithms:
10^3.2 = x
Now, we can evaluate 10^3.2:
10^3.2 ≈ 1584.89
Therefore, the value of x in the equation log(x) = 3.2 is approximately 1584.89.
To understand what "log x = 3.2" means, we need to know that "log" stands for the logarithm function. In this case, "log x" refers to the logarithm of x with a base of 10. So, to find the value of x in the equation "log x = 3.2," we need to solve for x using logarithmic properties.
Here's how you can find the value of x:
1. Start with the equation "log x = 3.2."
2. Rewrite the equation in exponential form by raising the base (10) to the power of both sides. In this case, it would be 10^(log x) = 10^3.2.
3. Simplify the exponential form. Since raising 10 to the power of the logarithm with base 10 cancels each other out, we are left with x = 10^3.2.
4. Use a calculator to evaluate 10^3.2. The approximate value is 1584.89.
Therefore, the value of x in the equation "log x = 3.2" is approximately 1584.89.