Find the vectors $\mathit{a}$ and $\mathit{b}$ in terms of $m$ and/or $c$.

find the time at which it would fly directly over the airport.

Find $\overrightarrow{\text{OB}}\bullet \overrightarrow{\text{AB}}$.

Find the time at which the bearing of the ship from the harbour is $045˚$.

Find the position vector $\overrightarrow{\text{OS}}$ of the ship at time $t$ hours.

Write down an expression for the position vector $\mathit{r}$ of the ship, $t$ hours after $1:00 \text{pm}$.

Find the distance between the two submarines at this time.

Find u.

Point D is also on L and has coordinates (8, 4, −9).

Find the area of triangle OCD.

Find a vector equation of the line that passes through P and Q.

Hence or otherwise, find the obtuse angle formed by the tangent line to $f$ at $x=8$ and the tangent line to $f$ at $x=2$.

The line through P and Q is perpendicular to the vector 2i $+$ nk. Find the value of $n$.

Find the value of t when the two submarines are closest together.

determine the coordinates of the point of intersection P.

Find the direct distance of the aircraft from the airport at this point.

Find $\left(f\circ f\right)\left(x\right)$.

Find the acute angle between $y=x$ and $L$.

state the height of the aircraft at this point.

Find the time at which the aircraft is 4 km above the ground.

Show that $\overrightarrow{\text{AB}}=\left(\begin{array}{c}2\\ -1\\ 1\end{array}\right)$.

Show that $\overrightarrow{\text{AC}}=\left(\begin{array}{c}8\\ -10\\ -1\end{array}\right)$.

A second line, $L_2$, is parallel to $L_1$ and passes through (1, 2, 3).

Write down a vector equation for $L_2$.

verify that it would pass directly over the airport.

Find the value of $p$.

Find $\left|\overrightarrow{\text{AB}}\right|$.

Find a vector equation for L.

Write down the value of angle OBA.

Find the value of $m$.

Consider a unit vector $\mathit{u}$, such that $\mathit{u}=p\mathit{i}-\frac{2}{3}\mathit{j}+\frac{1}{3}\mathit{k}$, where $p>0$.

Point $\text{C}$ is such that $\overrightarrow{\text{BC}}=9\mathit{u}$.

Find the coordinates of $\text{C}$.

Find the value of $y$.

Given that the velocity of the aircraft, after the adjustment of the angle of descent, is $\left(\begin{array}{c}-150\\ -50\\ a\end{array}\right)\text{km}{\text{h}}^{-1}$, find the value of $a$.

The vector $\left(\begin{array}{c}2\\ p\\ 0\end{array}\right)$ is perpendicular to $\overrightarrow{\text{AB}}$. Find the value of p.

Find the value of t when submarine B passes through P.

The point D has coordinates $(q^2,0,q)$. Given that $\overrightarrow{\text{DC}}$ is perpendicular to $L$, find the possible values of $q$.

Show that the two submarines would collide at a point P and write down the coordinates of P.

Find a vector equation for $L$.

Express $\overrightarrow{\text{AB}}$ in terms of $m$.

Write down a vector equation for the displacement, r of the aircraft in terms of $t$.

Find the gradient of $L$.

Hence, write down $f^{-1}\left(x\right)$.

Find the angle between $\overrightarrow{\text{AB}}$ and $\overrightarrow{\text{AC}}$.

Point C (k , 12 , −k) is on L. Show that k = 14.

Find the area of triangle ABC.

Show that $\overrightarrow{\text{AB}}=\left(\begin{array}{c}6\\ 8\\ -5\end{array}\right)$

The vector equation of line $L$ is given by r $=\left(\begin{array}{c}-1\\ 3\\ 8\end{array}\right)+t\left(\begin{array}{c}4\\ 5\\ -1\end{array}\right)$.

Point P is the point on $L$ that is closest to the origin. Find the coordinates of P.

Find a vector equation for L₁.

Find $c$.

Find the possible value(s) for $p$.

In the case that $p<0$, determine whether the lines intersect.

Find the value of $t$ when the ship will be closest to the lighthouse.

An alarm will sound if the ship travels within $20$ kilometres of the lighthouse.

State whether the alarm will sound. Give a reason for your answer.