Evaluate \(\begin{vmatrix}1+m&n&q\\m&1+n&q\\n&m&1+q\end{vmatrix}\).(a) -1(1+m+n+q)(b) 1+m+n+q(c) 1+2q(d) 1+qI have been asked this question during a job interview.I want to ask this question from Properties of Determinants topic in division Determinants of Mathematics – Class 12

Evaluate \(\begin{vmatrix}1+m&n&q\\m&1+n&q\\n&m&1+q\end{vmatrix}\).(a)

1.	Evaluate \(\begin{vmatrix}1+m&n&q\\m&1+n&q\\n&m&1+q\end{vmatrix}\).(a) -1(1+m+n+q)(b) 1+m+n+q(c) 1+2q(d) 1+qI have been asked this question during a job interview.I want to ask this question from Properties of Determinants topic in division Determinants of Mathematics – Class 12
Answer» Right answer is (a) -1(1+m+N+q) For explanation: GIVEN that, Δ=\(\begin{vmatrix}1+m&n&q\\m&1+n&q\\n&m&1+q\end{vmatrix}\) Applying C1→C1+C2+C3 Δ=\(\begin{vmatrix}1+m+n+q&n&q\\1+m+n+q&1+n&q\\1+m+n+q&m&1+q\end{vmatrix}\)=(1+m+n+q)\(\begin{vmatrix}1&n&q\\1&1+n&q\\1&m&1+q\end{vmatrix}\) Applying R1→R2-R1 Δ=(1+m+n+q)\(\begin{vmatrix}0&1&0\\1&1+n&q\\1&m&1+q\end{vmatrix}\) Expanding along the first row, we get Δ=(1+m+n+q)(0-1(1+q-q)+0) Δ=-1(1+m+n+q).

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