Please help, if you can. If you have a Log (x) = -0.123 ..... What does x = ?
0.7534? probably to more places than you can use.
Thank you!
To find the value of x when given log(x) = -0.123, you need to use the exponential function to "undo" the logarithm.
The equation log(x) = -0.123 is written in logarithmic form, where x is the base of the logarithm and -0.123 is the logarithm of x.
To solve for x, you can rewrite the equation in exponential form. The exponential form of a logarithm is x = a^b, where x is the base, a is the value, and b is the exponent.
In this case, for log(x) = -0.123, you would have x = 10^(-0.123), since the base 10 is commonly used with logarithms.
Therefore, to solve for x, you need to evaluate 10 to the power of -0.123. This can be done using a calculator or mathematical software.
When evaluating 10^(-0.123), the result is approximately 0.7213 (rounded to four decimal places). So, x ≈ 0.7213.
Hence, the solution to the equation log(x) = -0.123 is x ≈ 0.7213.