How do you solve #-11< 2x - 1\leq 7#?

2 Answers
May 31, 2018

#-5< x <=4#

Explanation:

#"add 1 to each of the 3 intervals"#

#-11color(red)(+1)<2xcancel(-1)cancel(color(red)(+1))<=7color(red)(+1)#

#-10<2x<=8#

#"divide each interval by 2"#

#-5< x<=4#

#x in(-5,4]larrcolor(blue)"in interval notation"#

May 31, 2018

#-5< x<=4#

Explanation:

We can start by adding #1# to all three parts of this inequality. We get

#-10<2x<=8#

Lastly, we can divide all three parts by #2# to isolate #x#. We get

#bar(ul(|color(white)(2/2)(-5< x<=4)color(white)(2/2)|#

The key realization here is that we have three parts to the inequality, so we have to apply the operations to all three parts of it.

Hope this helps!