First, expand the terms in parenthesis on each side of the equation by multiplying each term within the parenthesis by the term outside the parenthesis:
#color(red)(6)(m -2) + 14 = color(blue)(3)(m + 2) - 10#
#(color(red)(6) xx m) - (color(red)(6) xx 2) + 14 = (color(blue)(3) xx m) + (color(blue)(3) xx 2) - 10#
#6m - 12 + 14 = 3m + 6 - 10#
#6m + 2 = 3m - 4#
Next, subtract #color(red)(2)# and #color(blue)(3m)# from each side of the equation to isolate the #m# term while keeping the equation balanced:
#6m + 2 - color(red)(2) - color(blue)(3m) = 3m - 4 - color(red)(2) - color(blue)(3m)#
#6m - color(blue)(3m) + 2 - color(red)(2) = 3m - color(blue)(3m) - 4 - color(red)(2)#
#(6 - 3)m + 0 = 0 - 6#
#3m = -6#
Now, divide each side of the equation by #color(red)(3)# to solve for #m# while keeping the equation balanced:
#(3m)/color(red)(3) = -6/color(red)(3)#
#(color(red)(cancel(color(black)(3)))m)/cancel(color(red)(3)) = -2#
#m = -2#
