How do you solve #-39\leq 5x - 9= 16#?

1 Answer
Oct 14, 2017

#-39/5 <= x = 5#

Explanation:

#-39 <= 5x - 9 = 16#

This equation is in two phase, you have to solve each equally and separately..

We have..

#-39<= 5x -> "First phase"#

#5x - 9 = 16 -> "Second phase"#

Solving the first..

#-39 <= 5x#

Divide both sides by #color(red)5#

#-39/color(red)5 <= (5x)/color(red)5#

#-39/5 <= cancel(5x)/cancel5#

#-39/5 <= x#

Solving the second phase..

#5x - 9 = 16#

Add #color(blue)9# to both sides

#5x - 9 color(blue)(+9) = 16 color(blue)(+9)#

#5x - 9 + 9 = 16 + 9#

#5x + 0 = 25#

#5x = 25#

Divide both sides by #color(green)5#

#(5x)/color(green)5 = 25/color(green)5#

#cancel(5x)/cancel5 = 25/5#

#x = 25/5#

#x = 5#

Now combining both answers we have..

#-39/5 <= x = 5 -> Answer#