Find the number of non negative solutions of the system of equations: $$a + b = 10,$$   $$a + b + c + d = 21,$$    $$a + b + c + d + e + f = 33,$$      $$a + b + c + d + e + f + g + h = 46$$       and so on till $$a + b + c + d + ..... + x + y + z = 208.$$

Solution :
Consider the equation $$a + b = 10$$   number of solutions of this equation is $$^{10 + 2 - 1}{C_{2 - 1}} = 11.$$
Next equation is $$a + b + c + d = 21$$    hence $$c + d = 11$$   and number of solutions of this equation is 12.
Similarly for third equation $$a + b + c + d + e + f = 33$$      or $$e + f = 12$$   or number of solutions is 13.
Similarly for last equation $$a + b + c + d + ..... + x + y + z = 208,$$       or $$y + z = 22$$   or number of solution is 23.
Required number of ways is $$11 \times 12 \times 13 \times ..... \times 21 \times 22 \times 23 = \frac{{23!}}{{10!}} = {\,^{23}}{P_{13}}.$$