Is the inequality #-2(2x+9) > -4x+9# sometimes, always, or never true?

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Answer 1 · 2017-06-18T13:55:52

See a solution process below:

First, expand the term in parenthesis by multiplying each term within the parenthesis by the term outside the parenthesis:

#color(red)(-2)(2x + 9) > -4x + 9#

#(color(red)(-2) * 2x) + (color(red)(-2) * 9) > -4x + 9#

#-4x - 18 > -4x + 9#

Now, add #color(4x)# to each side of the inequality:

#color(4x) - 4x - 18 > color(4x) - 4x + 9#

#0 - 18 > 0 + 9#

#-18 > 9#

Because this inequality is not try, #-18# is actually less than #9#, then this inequality is never true.