![SOLVED: Explain how the graph of y=log2(x−2) can be obtained from the graph of the y=log2x using a simple transformation. Question content area bottom Part 1 Choose the correct choice below. A. SOLVED: Explain how the graph of y=log2(x−2) can be obtained from the graph of the y=log2x using a simple transformation. Question content area bottom Part 1 Choose the correct choice below. A.](https://cdn.numerade.com/ask_previews/a0af017c-be6b-4d40-a55a-4ec040411744_large.jpg)
SOLVED: Explain how the graph of y=log2(x−2) can be obtained from the graph of the y=log2x using a simple transformation. Question content area bottom Part 1 Choose the correct choice below. A.
![SOLUTION: Below is the graph of y=log2x . Translate it to become the graph of y=log2(x−4)+3 . SOLUTION: Below is the graph of y=log2x . Translate it to become the graph of y=log2(x−4)+3 .](http://theo.x10hosting.com/2018/022103.jpg)
SOLUTION: Below is the graph of y=log2x . Translate it to become the graph of y=log2(x−4)+3 .
SOLUTION: Find the domain and range of the graph of each function. y=log2(x-3) (2 is the base of the log) WE were told that the answer would involve inf. -inf or xero
![y = log2 x (2 внизу, в ответах тоже) Какой ответ правильный? 1.) log2 1,6 < 0 2.) log2 1 > 0 - Школьные Знания.com y = log2 x (2 внизу, в ответах тоже) Какой ответ правильный? 1.) log2 1,6 < 0 2.) log2 1 > 0 - Школьные Знания.com](https://ru-static.z-dn.net/files/dea/d54eac3d23fe8adc77cb51a2cdb6f0bd.png)