Suppose that the limit exists and equals c\in\mathbb{R} Then for eg \epsilon>1 some \delta>0 must exist with \leftx\right⋯ = log e a 0 0 ⋯ ∴ lim x → 0 a x − 1 x = log e a Therefore, it is proved that the limit of a raised to the power of x minus 1 by x as the value of x tends to 0 is equal to natural logarithm of constant a It can also be written in the following formLim (1/x, x>0) WolframAlpha Natural Language Math Input NEW Use textbook math notation to enter your math
How Do You Find The Limit Of Sqrt 1 9x Sqrt 1 8x X As X Approaches 0 Socratic