Question

Relative to an origin O, the position vectors of points A, B and C are given by `vec(OA)= 0uli + 2ulj + (-3)ulk` `vec(OB)= 2uli + 5ulj + (-2)ulk` `vec(OC)= 3uli + pulj + qulk` (i) In the case where ABC is a straight line, find the values of *p* and *q?

Relative to an origin O, the position vectors of points A, B and C are given by
`vec(OA)= 0uli + 2ulj + (-3)ulk`
`vec(OB)= 2uli + 5ulj + (-2)ulk`
`vec(OC)= 3uli + pulj + qulk`

(i) In the case where ABC is a straight line, find the values of p and q.
(ii) In the case where angle BAC is `90^@`, express q in terms of p .
(iii) In the case where `p=3` and the lengths of AB and AC are equal, find possible values of q ?

Answer 1

Part (i)

The vector form of the line that includes points A,B,C is:

`(x,y,z) = (0,2,-3)+ t{(2-0)hati+(5-2)hatj+(-2--3)hatk}`

Simplify the vector:

Line `L = (x,y,z) = (0,2,-3)+ t{2hati+3hatj+hatk}`

The parametric equations are:

`x = 2t`
`y = 3t+2`
`z = t-3`

`vec(OC)= 3hati + p hat j + q hatk` tells us that we must set `x = 3`, solve for t, and then use the value of t to compute the values of p and q.

Set `x = 3`:

`3 = 2t`

Solve for t:

`t = 3/2`

Use the value of t to find the value of p and q:

`p = y = 3(3/2)+2`

`p = 13/2`

`q = z = 3/2-3`

`q = -3/2`

Part (ii)

`vec(AB)= (2-0)hati+(5-2)hatj+(-2--3)hatk`

Simplify:

`vec(AB)=2hati+3hatj+hatk`

`vec(AC) = (3-0)hati+(p-2)hatj+(q+3)hatk`

Simplify:

`vec(AC) = 3hati+(p-2)hatj+(q+3)hatk`

For `angle BAC = 90^@`, `AB * AC = 0`:

`AB*AC = 2(3)+ 3(p-2)+q+3=0`

`q = -3p-3`

Part (iii)

The length of `vec(AB)` is

`|vec(AB)| = sqrt(2^2+3^2+1^2)`

`|vec(AB)| = sqrt(17)`

In `vec(AC)`, set `p=3`:

`vec(AC) = 3hati+(3-2)hatj+(q+3)hatk`

`vec(AC) = 3hati+hatj+(q+3)hatk`

Set the magnitudes equal:

`sqrt17= sqrt(3^2+1^2+(q+3)^2)`

Square both sides:

`17 = 3^2+1^2+(q+3)^2`

`(q+3)^2= 7`

`q+3 = +-sqrt7`

`q = -3-sqrt7` and `q = -3+sqrt7`

Answer 2

`p=13/2,q=-3/2`

Explanation:

We have

`bb(OA)=bba=((0),(2),(-3))`

`bb(OB)=bb(b)=((2),(5),(-2))`

`bb(OC)=bbc=((3),(p),(q))`

corresponding to the points `A,B,C`.

If `ABC` is on a straight line, then we can right that straight line in vector form as

`l:bba+lambda(bb(b)-bba)=((0),(2),(-3))+lambda(((2),(5),(-2))-((0),(2),(-3)))`

`=((0),(2),(-3))+lambda((2),(3),(1))`

which `bbc` will satisfy. In particular,

`((3),(p),(q))=((0),(2),(-3))+lambda((2),(3),(1))`

or

`3=2lambdarArrlambda=3/2`

`p=2+3lambda=2+3(3/2)=13/2`

`q=-3+lambda=-3+3/2=-3/2`