log 10, x = 2.7087 find x?
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To find the value of x, we can rewrite the given equation in exponential form using the definition of logarithms.
log 10 (x) = 2.7087
In exponential form, this equation can be written as:
10^2.7087 = x
Now, we can use a calculator to evaluate the right-hand side of the equation.
x ≈ 489.750
Therefore, the value of x is approximately 489.750.
To find the value of x, we need to solve the exponential equation log10(x) = 2.7087. In this equation, the base of the logarithm is 10.
In order to isolate x, we need to rewrite the equation using exponentiation. Remember that logarithms and exponentiation are inverse operations.
The equation log10(x) = 2.7087 can be rewritten as 10^(log10(x)) = 10^2.7087.
Since 10^(log10(x)) simplifies to x, the equation becomes x = 10^2.7087.
To find the value of x, we can evaluate the right side of the equation using a calculator or an online tool. By plugging in 2.7087 into the exponent of the base 10, we get x ≈ 501.187.
Therefore, the value of x that satisfies the equation log10(x) = 2.7087 is approximately 501.187.