Question

Without expanding, show that the values of each of the following determinants are zero:
(i) $\left|\begin{array}{ccc}8& 2& 7\\ 12& 3& 5\\ 16& 4& 3\end{array}\right|$

(ii) $\left|\begin{array}{ccc}6& -3& 2\\ 2& -1& 2\\ -10& 5& 2\end{array}\right|$

(iii) $\left|\begin{array}{ccc}2& 3& 7\\ 13& 17& 5\\ 15& 20& 12\end{array}\right|$

(iv) $\left|\begin{array}{ccc}1/a& a^2& bc\\ 1/b& b^2& ac\\ 1/c& c^2& ab\end{array}\right|$

(v) $\left|\begin{array}{ccc}a+b& 2a+b& 3a+b\\ 2a+b& 3a+b& 4a+b\\ 4a+b& 5a+b& 6a+b\end{array}\right|$

(vi) $\left|\begin{array}{ccc}1& a& a^2-bc\\ 1& b& b^2-ac\\ 1& c& c^2-ab\end{array}\right|$

(vii) $\left|\begin{array}{ccc}49& 1& 6\\ 39& 7& 4\\ 26& 2& 3\end{array}\right|$

(viii) $\left|\begin{array}{ccc}0& x& y\\ -x& 0& z\\ -y& -z& 0\end{array}\right|$

(ix) $\left|\begin{array}{ccc}1& 43& 6\\ 7& 35& 4\\ 3& 17& 2\end{array}\right|$

(x) $\left|\begin{array}{cccc}{1}^2& 2^2& 3^2& 4^2\\ 2^2& 3^2& 4^2& 5^2\\ 3^2& 4^2& 5^2& 6^2\\ 4^2& 5^2& 6^2& 7^2\end{array}\right|$

(xi) $\left|\begin{array}{ccc}a& b& c\\ a+2x& b+2y& c+2z\\ x& y& z\end{array}\right|$

Answer 1

$$\begin{gathered} \left(i\right)∆=\left|\begin{array}{ccc}8& 2& 7\\ 12& 3& 5\\ 16& 4& 3\end{array}\right| \\ =\left|\begin{array}{ccc}0& 2& 7\\ 0& 3& 5\\ 0& 4& 3\end{array}\right|\left[\mathrm{Applying}{C}_1\to C_1-4C_2\right] \\ \Rightarrow ∆=0 \\ \left(ii\right)∆=\left|\begin{array}{ccc}6& -3& 2\\ 2& -1& 2\\ -10& 5& 2\end{array}\right| \\ =\left|\begin{array}{ccc}0& -3& 2\\ 0& -1& 2\\ 0& 5& 2\end{array}\right|\left[\mathrm{Applying}{C}_1\to C_1+2C_2\right] \\ \Rightarrow ∆=0 \end{gathered}$$

​$$\begin{gathered} \left(iii\right)∆=\left|\begin{array}{ccc}2& 3& 7\\ 13& 17& 5\\ 15& 20& 12\end{array}\right| \\ =\left|\begin{array}{ccc}2& 3& 7\\ 13& 17& 5\\ 13& 17& 5\end{array}\right|\left[\mathrm{Applying}{R}_3\to R_3-R_1\right] \\ \Rightarrow ∆=0 \\ \left(iv\right)∆=\left|\begin{array}{ccc}\frac{1}{a}& a^2& bc\\ \frac{1}{b}& b^2& ac\\ \frac{1}{c}& c^2& ab\end{array}\right| \\ =\left|\begin{array}{ccc}1& a^3& abc\\ 1& b^3& abc\\ 1& c^3& abc\end{array}\right|\left[\mathrm{Applying}{R}_1\to a{R}_1,R_2\to b{R}_2\mathrm{and}{R}_3\to c{R}_3\right] \\ =abc\left|\begin{array}{ccc}1& a^3& 1\\ 1& b^3& 1\\ 1& c^3& 1\end{array}\right| \\ \Rightarrow ∆=0 \\ \left(v\right)∆=\left|\begin{array}{ccc}a+b& 2a+b& 3a+b\\ 2a+b& 3a+b& 4a+b\\ 4a+b& 5a+b& 6a+b\end{array}\right| \\ =\left|\begin{array}{ccc}a& a& a\\ 2a& 2a& 2a\\ 4a+b& 5a+b& 6a+b\end{array}\right|\left[\mathrm{Applying}{R}_1\to R_2-R_1\mathrm{and}{R}_2\to R_3-R_2\right] \\ =2\left|\begin{array}{ccc}a& a& a\\ a& a& a\\ 4a+b& 5a+b& 6a+b\end{array}\right|=0 \\ \left(vi\right)∆=\left|\begin{array}{ccc}1& a& a^2-bc\\ 1& b& b^2-ac\\ 1& c& c^2-ab\end{array}\right| \\ =\left|\begin{array}{ccc}0& a-b& a^2-bc-b^2+ac\\ 0& b-c& b^2-ac-c^2+ab\\ 1& c& c^2-ab\end{array}\right|\left[\mathrm{Applying}{R}_1\to R_1-R_2,R_2\to R_2-R_3\right] \\ =\left|\begin{array}{ccc}0& a-b& \left(a-b\right)\left(a+b\right)+c\left(a-b\right)\\ 0& b-c& \left(b-c\right)\left(b+c\right)+a\left(b-c\right)\\ 1& c& c^2-ab\end{array}\right| \\ =\left(a-b\right)\left(b-c\right)\left|\begin{array}{ccc}0& 1& \left(a+b+c\right)\\ 0& 1& \left(a+b+c\right)\\ 1& c& c^2-ab\end{array}\right| \\ \Rightarrow ∆=0 \\ \left(vii\right)∆=\left|\begin{array}{ccc}49& 1& 6\\ 39& 7& 4\\ 26& 2& 3\end{array}\right| \\ =\left|\begin{array}{ccc}1& 1& 6\\ 7& 7& 4\\ 2& 2& 3\end{array}\right|\left[\mathrm{Applying}{C}_1\to C_1-8C_3\right] \\ \Rightarrow ∆=0 \\ \left(viii\right)∆=\left|\begin{array}{ccc}0& x& y\\ -x& 0& z\\ -y& -z& 0\end{array}\right| \\ =\frac{xyz}{xyz}\left|\begin{array}{ccc}0& x& y\\ -x& 0& z\\ -y& -z& 0\end{array}\right| \\ =\frac{1}{xyz}\left|\begin{array}{ccc}0& xz& yz\\ -xy& 0& zy\\ -yx& -zx& 0\end{array}\right| \\ =\frac{1}{xyz}\left|\begin{array}{ccc}-2xy& 0& 2yz\\ -xy& 0& zy\\ -yx& -zx& 0\end{array}\right|\left[\mathrm{Applying}{R}_1\to R_1+R_2+R_3\right] \\ =\frac{1}{xyz}\left|\begin{array}{ccc}0& 0& 0\\ -xy& 0& zy\\ -yx& -zx& 0\end{array}\right|=0\left[\mathrm{Applying}{R}_1\to R_1-2R_2\right] \\ \left(ix\right)∆=\left|\begin{array}{ccc}1& 43& 6\\ 7& 35& 4\\ 3& 17& 2\end{array}\right| \\ =\left|\begin{array}{ccc}1& 1& 6\\ 7& 7& 4\\ 3& 3& 2\end{array}\right|=0\left[\mathrm{Applying}{C}_2\to C_2-7C_3\right] \end{gathered}$$

$$\begin{gathered} x)∆=\left|\begin{array}{cccc}{1}^2& 2^2& 3^2& 4^2\\ 2^2& 3^2& 4^2& 5^2\\ 3^2& 4^2& 5^2& 6^2\\ 4^2& 5^2& 6^2& 7^2\end{array}\right| \\ =\left|\begin{array}{cccc}1& 4& 9& 16\\ 4& 9& 16& 25\\ 9& 16& 25& 36\\ 16& 25& 36& 49\end{array}\right| \\ =\left|\begin{array}{cccc}1& 4& 9& 16\\ 4& 9& 16& 25\\ 5& 7& 9& 11\\ 7& 9& 11& 13\end{array}\right|\left[\mathrm{Applying}{R}_3\to R_3-R_2\mathrm{and}{R}_4\to R_4-R_3\right] \\ =\left|\begin{array}{cccc}1& 4& 9& 16\\ 4& 9& 16& 25\\ 7& 9& 11& 13\\ 7& 9& 11& 13\end{array}\right|=0\left[\mathrm{Applying}{R}_3\to 2+R_3\right] \\ xii)∆=\left|\begin{array}{ccc}a& b& c\\ a+2x& b+2y& c+2z\\ x& y& z\end{array}\right| \\ =\left|\begin{array}{ccc}a+2x& b+2y& c+2z\\ a+2x& b+2y& c+2z\\ x& y& z\end{array}\right|\left[\mathrm{Applying}{R}_1\to R_1+2R_3\right] \\ =\left|\begin{array}{ccc}0& 0& 0\\ a+2x& b+2y& c+2z\\ x& y& z\end{array}\right|=0\left[\mathrm{Applying}{R}_1\to R_1-R_2\right] \end{gathered}$$