`" Let " Delta_(r)=|{:(r-1,,n,,6),((r-1)^(2),,2n^(2),,4n-2),((r-1)^(2),,3n^(3),,3n^(2)-3n):}|. " Show that " Sigma_(r=1)^(n) Delta_(r)` is constant.

`" Let " Delta_(r)=|{:(r-1,,n,,6),((r-1)^(2),,2n^(2),,4n-2),((r-1)^(2)

1.	`" Let " Delta_(r)=\|{:(r-1,,n,,6),((r-1)^(2),,2n^(2),,4n-2),((r-1)^(2),,3n^(3),,3n^(2)-3n):}\|. " Show that " Sigma_(r=1)^(n) Delta_(r)` is constant.
Answer» Since `c_(1)` has variable terms and `c_(2) " and " c_(3)` have constant terms summation is taken to `C_(1)` Therefore, `overset(n)underset(r=1)(Sigma) \|{:(overset(n)underset(1)(Sigma)(r-1),,n,,6),(overset(n)underset(1)(Sigma)(r-1)^(2),,2n^(2),,4n-2),(overset(n)underset(1)(Sigma)(r-1)^(3),,3n^(3),,3n^(2)-3n):}\|` `\|{:((1)/(2)(n-1)n,,n,,6),((1)/(6) (n-1)(2n-1),,2n^(2),,4n-2),((1)/(4) (n-1)^(2)n^(2),,3n^(3),,3n^(2)-3n):}\|` Taking `(1)/(12) n(n-1)` common from `C_(1) " and " n` common from `C_(2)` we get ` Sigma Delta_(r)=(1)/(12)n^(2)(n-1) xx\|{:(6,,1,,6),(2(2n-1),,2n,,2(2n-1)),(3n(n-1),,3n^(2),,3n(n-1)):}\|` `=0 " Which is constant " [:. C_(1) " and " C_(3) " are identical "]`