The position vectors of points A, B and C with respect to the origin are...

Explanation

Position vector of A is (8i - 10j)

Position vector of B is (2i + 6j)

Position vector of C is (-10i + 4j).

Let position vector of N be (ai + bj).

ABCN is a parallelogram.

\(\therefore \overrightarrow{AB} = \overrightarrow{NC}\).

\(\begin{bmatrix} (2 - 8)i \\ (6 + 10)j \end{bmatrix} = \begin{bmatrix} (-10 - a)i \\ (4 - b)j \end{bmatrix}\)

Equating components,

\(2 - 8 = -10 - a \implies a = -4\)

\(6 + 10 = 4 - b \implies b = -12\)

The position vector of N is (-4i - 12j).

(b) \(\overrightarrow{AN} \cdot \overrightarrow{AB}\)

\(\overrightarrow{AN} = \bar{A} - \bar{N} \)

= \((8i - 10j) - (-4i - 12j)\)

= \(12i + 2j\)

\(\overrightarrow{AB} = \bar{A} - \bar{B}\)

= \((8i - 10j) - (2i + 6j)\)

= \(6i - 16j\)

\(\therefore \overrightarrow{AN} \cdot \overrightarrow{AB} = (12i + 2j) \cdot (6i - 16j)\)

= \(72 - 32 = 40\)

(c) Let \(\theta\) be the acute angle between \(\overrightarrow{AN}\) and \(\overrightarrow{AB}\).

\(\overrightarrow{AN} \cdot \overrightarrow{AB} = |AN||AB| \cos \theta\)

\(|AN| = |12i + 2j| = \sqrt{12^{2} + 2^{2}} = \sqrt{144 + 4} = \sqrt{148}\)

\(|AB| = |6i - 16j| = \sqrt{6^{2} + (-16)^{2}} = \sqrt{36 + 256} = \sqrt{292}\)

\(\therefore 40 = (\sqrt{148})(\sqrt{292}) \cos \theta\)

\(\cos \theta = \frac{40}{(\sqrt{148})(\sqrt{292})}\)

\(\cos \theta = \frac{40}{207.88} = 0.1924\)

\(\theta = \cos^{-1} (0.1924) = 78.907°\)

\(\approxeq 78.9°\)