How would I write this in exponential form?
log(3)1/27= -3
3 ^ ( - 3 ) = 1 / 27
OR
1 / 3 ^ 3 = 1 / 27
To write the given equation in exponential form, you should understand that the logarithm function and the exponential function are inverse of each other. The logarithm function is used to determine the exponent needed to raise a base to obtain a certain value.
In this case, we have the equation: log(3)1/27 = -3. The base of the logarithm is 3, and the result is -3. This means that 3 raised to the power of -3 equals 1/27.
To express this equation in exponential form, you raise the base 3 to the power of -3, which gives you the result 1/27. Therefore, the exponential form of the equation is:
3^(-3) = 1/27.
Remember that in exponential form, the base is raised to the power of the exponent to obtain the result.