Begin by graphing f(x)=log_{2}x Then use transformations of this graph to graph the given function. What is the vertical asymptote? Use the graphs to determine each functions domain and range. g(x)= -2log_{2}x

Albarellak

Albarellak

Answered question

2021-01-28

Begin by graphing f(x)=log2x Then use transformations of this graph to graph the given function. What is the vertical asymptote? Use the graphs to determine each functions domain and range. g(x)= 2log2x

Answer & Explanation

brawnyN

brawnyN

Skilled2021-01-29Added 91 answers

Step 1 For the following Logarithmic function defined by 1) f(x)= log2x Graphing Logarithmic function given in equation (1) requires setting up table of coordinates, so that

xf(x)=y= log2x(x,y)1f(1)=y= log2(1) 2y=1=20 y=0(1,0)2f(2)=y= log2(2) 2y=2=21 y=1(2,1)4f(4)=y= log2(4) 2y=4=22 y=2(4,2)8f(8)=y= log2(8) 2y=8=23 y=3(8,3)16f(16)=y= log2(16) 2y=16=24 y=4(16,4)32f(32)=y= log2(32) 2y=32=25 y=5(32,5)64f(64)=y= log2(64) 2y=64=26 y=6(64,6)

Step 2 We plot the following points between (x, y) determined from the table of coordinates and connect them with the continuous curve which represent the Logarithmic function f(x)=log2x as shown in Figure (1). Figure (1) represent the graph of Logarithmic function f(x)= log2x image

Step 3 Note that: The y-axis which represented by the equation x=0 is the vertical asymptote, so that the curve approches, but never touches the positive portion of the y-axis as shown in figure (1). The domain of f(x)= log2(x) is all positive real numbers x  (0, ) andthe range is all real numbers y  (, ).

Step 4 To graph the Logarithmic function g(x)= 2 log2<

Do you have a similar question?

Recalculate according to your conditions!

New Questions in College algebra

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?