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Write the equation in logarithmic form. Assume that all constants are positive and not equal to 1.

[tex]\[ 10^w = c \][/tex]

[tex]\[\log_{10}(c) = w\][/tex]

Sagot :

GinnyAnswer
To convert the given exponential equation [tex]\(10^w = c\)[/tex] into its logarithmic form, we need to use the properties of logarithms.

The general form of an exponential equation is [tex]\(a^b = c\)[/tex], where [tex]\(a\)[/tex] is the base, [tex]\(b\)[/tex] is the exponent, and [tex]\(c\)[/tex] is the result. To convert this into logarithmic form, we write it as:

[tex]\[ b = \log_a(c) \][/tex]

Here is the step-by-step transformation:

1. Identify the base of the exponential equation, which is 10 in this case.

2. Identify the exponent, which is [tex]\(w\)[/tex].

3. Identify the result, which is [tex]\(c\)[/tex].

Given the exponential equation:

[tex]\[ 10^w = c \][/tex]

According to the properties of logarithms, we'll convert the equation into its equivalent logarithmic form. The logarithmic form:

[tex]\[ w = \log_{10}(c) \][/tex]

Since the base of the logarithm is 10, we typically write it simply as:

[tex]\[ w = \log(c) \][/tex]

So, the equation [tex]\(10^w = c\)[/tex] in logarithmic form is:

[tex]\[ w = \log(c) \][/tex]

And this is the detailed, step-by-step solution to converting the given exponential equation into its logarithmic form.
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