First, expand and combine the terms on the left side of the inequality being careful to manage the signs of each term correctly:
#7 - x - 1 >= 6 - 9x#
#7 - 1 - x >= 6 - 9x#
#6 - x >= 6 - 9x#
Next, subtract #color(red)(6)# and add #color(blue)(9x)# to each side of the inequality to isolate the #x# term while keeping the inequality balanced:
#6 - color(red)(6) - x + color(blue)(9x) >= 6 - color(red)(6) - 9x + color(blue)(9x)#
#0 - x + color(blue)(9x) >= 0 - 0#
#-x + color(blue)(9x) >= 0#
#-1x + color(blue)(9x) >= 0#
#(-1 + color(blue)(9))x >= 0#
#8x >= 0#
Now, divide each side of the inequality by #color(red)(8)# to solve for #x# while keeping the equation balanced:
#(8x)/color(red)(8) >= 0/color(red)(8)#
#(color(red)(cancel(color(black)(8)))x)/cancel(color(red)(8)) >= 0#
#x >= 0#
Or, in interval notation:
#[0, +oo)#
