Question 7

MCQHARD

Let $L$ be the straight line joining the points $P(1, 2, -1)$ and $Q(2, 3, 1)$ . Let $S$ be the foot of the perpendicular drawn from the point $R(4, -1, 5)$ to the line $L$ . Another line passing through $R$ intersects $L$ at a point $T$ such that the point $S$ divides the line segment $PT$ internally in the ratio $|PS| : |ST| = 1 : 2$ , where $|PS|$ and $|ST|$ are the lengths of the line segments $PS$ and $ST$ , respectively.

Then which of the following statements is (are) TRUE ?

(A)

The orthocentre of the triangle $PRT$ is $(\frac{23}{5}, -4, \frac{31}{5})$

(B)

The orthocentre of the triangle $PRT$ is $(4, 3, 5)$

(C)

The area of the triangle $PRT$ is $6\sqrt{5}$

(D)

The area of the triangle $PRT$ is $18\sqrt{5}$

Detailed Solution

Direction of line $L$ is $\vec{v} = Q - P = (1, 1, 2)$ . Equation of $L$ : $\vec{r} = (1, 2, -1) + \lambda(1, 1, 2)$ . Let $S = (1+\lambda, 2+\lambda, -1+2\lambda)$ . $\vec{RS} = (\lambda-3, \lambda+3, 2\lambda-6)$ . Since $RS \perp L$ , $\vec{RS} \cdot \vec{v} = 0 \Rightarrow (\lambda-3) + (\lambda+3) + 2(2\lambda-6) = 0 \Rightarrow 6\lambda = 12 \Rightarrow \lambda = 2$ . So $S = (3, 4, 3)$ . $S$ divides $PT$ internally in ratio $1:2$ : $S = \frac{2P + T}{3} \Rightarrow T = 3S - 2P = 3(3, 4, 3) - 2(1, 2, -1) = (7, 8, 11)$ . Area of $\Delta PRT$ : Base $PT = |T - P| = \sqrt{6^2 + 6^2 + 12^2} = \sqrt{216} = 6\sqrt{6}$ . Altitude $RS = |S - R| = \sqrt{(3-4)^2 + (4+1)^2 + (3-5)^2} = \sqrt{1 + 25 + 4} = \sqrt{30}$ . Area $= \frac{1}{2} \times 6\sqrt{6} \times \sqrt{30} = 3\sqrt{180} = 18\sqrt{5}$ . (D is correct). Orthocentre $H$ lies on altitude $RS$ : $H = R + k(S - R) = (4, -1, 5) + k(-1, 5, -2) = (4-k, -1+5k, 5-2k)$ . Altitude from $P$ to $RT$ : $\vec{PH} \cdot \vec{RT} = 0$ . $\vec{RT} = (3, 9, 6)$ . $\vec{PH} = (3-k, -3+5k, 6-2k)$ . $(3-k)(3) + (-3+5k)(9) + (6-2k)(6) = 0 \Rightarrow 9 - 3k - 27 + 45k + 36 - 12k = 0 \Rightarrow 30k + 18 = 0 \Rightarrow k = -\frac{3}{5}$ . $H = (4 + 3/5, -1 - 3, 5 + 6/5) = (23/5, -4, 31/5)$ . (A is correct).

Question 7

Detailed Solution

Boost Your Exam Preparation!