Graph the piecewise-defined function

Question

asked Jul 11, 2019 110k views

2 Answers

Edmund Rojas · Answer 1 · 2019-07-12T17:07:07+0000

Start by graphing y = |x|. Its vertex is at (0,0), and the graph opens up.

Now translate the entire graph 4 units up. The new vertex will be at (0,4). Draw an empty circle around this point.

Darken the graph of y = |x|+4 ONLY for the part which is left of the y-axis.

Now plot a dark dot at (0,4). Draw a dark, horiz. line from that dot to the right.

That's it!

Vijay Katam · Answer 2 · 2019-07-17T17:16:13+0000

The function f(x) is given by:

f(x)= |x|+4, if x<0

and 4 , if x ≤ 0.

The graph of the function is a strictly decreasing continuous graph i.e. a line with a slope as: -1.

Since, the function f(x) for x<0 is given by:

f(x)= -x+4

also at x=0- f(x)=4

Also , for x≥0 the graph of the function is a straight line parallel to the x-axis.

Also, the left hand limit at x=0 is equal to the right hand limit at x=0 is equal to the function's value at x=0.

Hence, the graph of the function is continuous for all the real values.