Question

If area of triangle whose vertices are $\left(a,a^2\right),\left(b,b^2\right),\left(c,c^2\right)$ is 1 and area of another triangle whose vertices are $\left({\alpha }^2,\alpha \right),\left({\beta }^2,\beta \right)$ and $\left({\gamma }^2,\gamma \right)$ is 2 , then the absolute value of $\left|\begin{array}{ccc}(a+\alpha {)}^2& (b+\alpha {)}^2& (c+\alpha {)}^2\\ (a+\beta {)}^2& (b+\beta {)}^2& (c+\beta {)}^2\\ (a+\gamma {)}^2& (b+\gamma {)}^2& (c+\gamma {)}^2\end{array}\right|$is equal to

• A. 2
• B. 4
• C. 8
• D. 16

Answer 1

Answer: (D)

Given determinant $=\left|\begin{array}{ccc}{a}^2& 2a& 1\\ b^2& 2b& 1\\ c^2& 2c& 1\end{array}\right|\times \left|\begin{array}{ccc}1& \alpha & {\alpha }^2\\ 1& \beta & {\beta }^2\\ 1& \gamma & {\gamma }^2\end{array}\right|=2\times 2\times 1\times 2\times 2=16$