SSCE HSC Mathematics Extension 2 3D vectors: The point A has position vector

Question

The point A has position vector $8	extbf{i} - 6	extbf{j} + 5	extbf{k}$. The line $l$ has vector equation

$$x	extbf{i} + y	extbf{j} + z	extbf{k} = l(	extbf{i} + 	extbf{j} + 2	extbf{k}).$$

The point B lies on $l$ and has position vector $p	extbf{i} + 2p	extbf{j} + 2p	extbf{k}$.

(i) Show that $|AB|^2 = 6p^2 - 24p + 125$.

(ii) Hence, or otherwise, determine the shortest distance between the point A and the line $l$.

A particle is moving in simple harmonic motion, described by $	extbf{x} = -4	extbf{(}x + 1	extbf{)}$.

When the particle passes through the origin, the speed of the particle is 4 m/s.

What distance does the particle travel during a full period of its motion?

A particle of unit mass moves horizontally in a straight line. It experiences a resistive force proportional to $v^2$, where $v$ m/s is the speed of the particle, so that the acceleration is given by $-kv^2$.

Initially the particle is at the origin and has a velocity of 40 m s$^{-1}$ to the right. After the particle has moved 15 m to the right, its velocity is 10 m s$^{-1}$ (to the right).

(i) Show that $y = 40e^{-kt}$.

(ii) Show that $k = rac{4}{15}$.

(iii) At what time will the particle's velocity be 30 m s$^{-1}$ to the right?

It is known that for all positive real numbers $x, y$

$$x + y 	ext{ } 
eq 2	ext{ }	ext{ }	ext{ }	ext{ }	ext{ }	ext{ }	ext{ } 	ext{ } 	ext{ }	ext{ }	ext{ }	ext{ }	ext{ }	ext{ }	ext{ }	ext{ }	ext{ } 	ext{ }	ext{ } 	ext{ }	ext{ }	ext{ }	ext{ } 	ext{ } 	ext{ }	ext{ } 	ext{ }	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ }	ext{ } 	ext{ }	ext{ }	ext{ }	ext{ }	ext{ } 	ext{ } 	ext{ }	ext{ }	ext{ }	ext{ } 	ext{ } 	ext{ }	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ }	ext{ } 	ext{ }

(DO NOT prove this.).

Show that if $a, b, c$ are positive real numbers with $ rac{1}{a} + rac{1}{b} + rac{1}{c} = 1$ then $a/b + b/c + c/a 	ext{ } 	ext{ } 	ext{ } 	ext{ }	ext{ }	ext{ }	ext{ }	ext{ }	ext{ }	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ }	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	ext{ } 	o 	ext{ } abc$.

The point A has position vector $8 extbf{i} - 6 extbf{j} + 5 extbf{k}$ - HSC - SSCE Mathematics Extension 2 - Question 13 - 2024 - Paper 1

Worked Solution & Example Answer:The point A has position vector $8 extbf{i} - 6 extbf{j} + 5 extbf{k}$ - HSC - SSCE Mathematics Extension 2 - Question 13 - 2024 - Paper 1

(a) (i) Show that $|AB|^2 = 6p^2 - 24p + 125$.

(a) (ii) Hence, or otherwise, determine the shortest distance between the point A and the line $l$.

(b) What distance does the particle travel during a full period of its motion?

(c) (i) Show that $y = 40e^{-kt}$.

(c) (ii) Show that $k = rac{4}{15}$.

(c) (iii) At what time will the particle's velocity be 30 m s$^{-1}$ to the right?

(d) Show that if $a, b, c$ are positive real numbers with $ rac{1}{a} + rac{1}{b} + rac{1}{c} = 1$ then $a/b + b/c + c/a o abc$.

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