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Select the graph for the solution of the open sentence. Click until the correct graph appears. 2|x| < 4

Select the graph for the solution of the open sentence. Click until the correct graph appears. 2|x| < 4
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Select the graph for the solution of the open sentence. Click until the correct graph appears. 2|x| < 4

User Ben Norris
by
7.2k points

2 Answers

1 vote

Answer:

The correct graph would be the one with open circles on -2 and 2 and shaded between those two dots.

Explanation:

2|x| < 4

-divide both sides by 2

|x| < 2

x < 2 or x > -2

:)

User Christopher Currens
by
8.1k points
7 votes

Answer:

We have to plot the graph of the inequality:


2|x|<4

i.e.
|x|<2

the graph is a number line representing the possible values of 'x' by solving the inequality.

the inequality is solved as:

-2<x<2

i.e. the region is: (-2,2); i.e. we have all the real values between -2 and 2 such that 2 and -2 is not included hence there is a open circle at 2 and -2.

the graph of the solution is attached to the answer.


Select the graph for the solution of the open sentence. Click until the correct graph-example-1
User Nulik
by
7.8k points
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