Step 1) Solve the first equation for #m#:
#m - n = -9#
#m - n + color(red)(n) = -9 + color(red)(n)#
#m - 0 = -9 + n#
#m = -9 + n#
Step 2) Substitute #(-9 + n)# for #m# in the second equation and solve for #n#:
#7m + 2n 9# becomes:
#7(-9 + n) + 2n = 9#
#(7 * -9) + (7 * n) + 2n = 9#
#-63 + 7n + 2n = 9#
#-63 + (7 + 2)n = 9#
#-63 + 9n = 9#
#color(red)(63) - 63 + 9n = color(red)(63) + 9#
#0 + 9n = 72#
#9n = 72#
#(9n)/color(red)(9) = 72/color(red)(9)#
#(color(red)(cancel(color(black)(9)))n)/cancel(color(red)(9)) = 8#
#n = 8#
Step 3) Substitute #8# for #n# in the solution to the first equation and the end of Step 1 and calculate #m#:
#m = -9 + n# becomes:
#m = -9 + 8#
#m = -1#
The Solution Is: #m = -1# and #n = 8#
