First, subtract #color(red)(4)# from each side of the inequality to isolate the #x# term while keeping the inequality balanced:
#-color(red)(4) + 12 >= -color(red)(4) + 4 + (5x)/8#
#8 >= 0 + (5x)/8#
#8 >= (5x)/8#
Now, multiply each side of the inequality by #color(red)(8)/color(blue)(5)# to solve for #x# while keeping the inequality balanced:
#color(red)(8)/color(blue)(5) xx 8 >= color(red)(8)/color(blue)(5) xx (5x)/8#
#64/5 >= cancel(color(red)(8))/cancel(color(blue)(5)) xx (color(blue)(cancel(color(black)(5)))x)/color(red)(cancel(color(black)(8)))#
#64/5 >= x#
To write the solution in terms of #x# we can reverse or "flip" the entire inequality:
#x <= 64/5#
