Solve for x in the logarithmic equation 10log(105)=10x
.(1 point)
x=
We can rewrite the equation as 10log₁₀(105) = 10x. Then, we use the property of logarithms that states log₁₀(b) = c if and only if 10^c = b. Therefore, we have 105 = 10^x. To solve for x, we take the logarithm on both sides: log₁₀(105) = log₁₀(10^x). Using the property again, we have log₁₀(105) = x. Thus, x = log₁₀(105).
So, x=log₁₀(105).