Author Topic: Vector extended response ratio (Read 1052 times) Tweet Share

Martoman · « **on:** March 05, 2010, 08:30:26 pm »

Again, I will probably answer this question in under .002 nanoseconds after posting, but still: this is annoying a few of the year 12's and thus is passed on to me... which I can't do... grr

So here it is:

The points A and B have position vectors a and b respectively, referrred to an origin O. The point C lies on AB, between AB, and is such that AC:CB = 2: 1, and D is the midpoint of OC. The line AD produced meets OB at E.

Find the ratios OE:EB and AE:ED. I think that all that I need to know is how to get OE:EB then logic my way through the next one.

I reason that OB = b then OE = kb, with $0 < k < 1$ and by going all the way around the triangle formed EB = -kb + a + -a + b = b(1-k) and now the ratio is $\frac{k}{1-k}$

.... I am missing something here. Going around the triangle to find OB and EB in different forms has only led me back to them being the same thing. $:-\$

qshyrn · « **Reply #1 on:** March 05, 2010, 09:09:23 pm »

let DE=k AE
let OE=s OB=s b

AC=2/3 AB= 2/3 b- 2/3 a

OD=1/2 (a+ 2/3 b- 2/3 a)

AE=s b - a
DE= k AE=ks b - k a

OD+DE=OE
1/2(a+2/3 b- 2/3 a)+ks b- k a= s b
a(1/2- 2/6-k)+ b(2/6+ks-s)=0
k= 1/2-2/6= 3/6
and
2/6+(3/6)s-s=0
then solve for that and you get k=1/6, s=2/5
Note: its like likely i screwed up somewhere(and yes my solution is quite messy lol)

Chavi · « **Reply #2 on:** March 05, 2010, 09:35:47 pm »

Ok - here's my working:

let $\overrightarrow{O A} = a \overrightarrow{O B} = b$
$\overrightarrow{A B} = b-a$

$\overrightarrow{A C} = \frac{1}{3} (a + 2b)$ and $\overrightarrow{O C} = \overrightarrow{O A} + \overrightarrow{A C}$

$\overrightarrow{O C} = a + \frac{2}{3} b - \frac{2}{3} a = \frac{1}{3} (a + 2b)$

$\Longrightarrow \overrightarrow{O D} = \frac{1}{2} \overrightarrow{O C} = \frac{1}{6} (a - 2b)$

$\overrightarrow{A D} = \overrightarrow{O D} - \overrightarrow{O A} = \frac{-5a}{6} + 2b$

Okay, so let
$\overrightarrow{D E} = \Upsilon \overrightarrow{A D}$
and $\overrightarrow{O E} = \overrightarrow{O D} - \overrightarrow{D E} = \frac{1}{6} (a + 2b) + \Upsilon \overrightarrow{A D}$
$= (\frac{1}{6} - \frac{5\Upsilon}{6})a + (\frac{1}{3} + 2\Upsilon)b$

but $\overrightarrow{O E} = k\overrightarrow{O B} = k\tilde{b}$
and
$\Longrightarrow ( \frac{1}{6} - \frac{5\Upsilon}{6})a + (\frac{1}{3} + 2\Upsilon)b = k\tilde{b}$
equate the coefficients:
$\frac{1}{6} - \frac{5\Upsilon}{6} = 0$ and $\frac{1}{3} + 2\Upsilon = k}$
therefore $\Upsilon = \frac{1}{5}$
$\overrightarrow{D E} = \frac{1}{5}\overrightarrow{A D}$
therefore $AD : DE = 5:1$

from earlier $\frac{1}{3} + 2\Upsilon = k}$
so $k = \frac{11}{15}$
$\Longrightarrow \overrightarrow{O E} = \frac{11}{15}\overrightarrow{O B}$
and the ratio of $OE : OB = 11 : 15$

Hope that helps /// Apologies in advance for any errors.

kamil9876 · « **Reply #3 on:** March 05, 2010, 09:44:04 pm »

I had the same idea in my working before qshyrn beat me to it.

It is true under the assumption that $a$ and $b$ are not parralel. Which is probably reasonable to assume, otherewise those ratios will not exist.

Martoman · « **Reply #4 on:** March 05, 2010, 11:00:17 pm »

Quote from: Chavi on March 05, 2010, 09:35:47 pm

Okay, so let
$\overrightarrow{D E} = \Upsilon \overrightarrow{A D}$
and $\overrightarrow{O E} = \overrightarrow{O D} - \overrightarrow{D E} = \frac{1}{6} (a + 2b) + \Upsilon \overrightarrow{A D}$
$= (\frac{1}{6} - \frac{5\Upsilon}{6})a + (\frac{1}{3} + 2\Upsilon)b$

Hope that helps /// Apologies in advance for any errors.

That last line should read $(\frac{1}{6} - \frac{5\Upsilon}{6})a + (\frac{1 + 2\Upsilon}{3})b$

Then $k = 2/5$

Which means $\overrightarrow{OE} = \frac{2}{5}\overrightarrow{OB}$

so $5-2$ gets it into the right parts as $OE:OB = 2:3$

Many thanks for the assistance, key insight being make another vector to be equal to it.

Martoman · « **Reply #5 on:** March 05, 2010, 11:17:20 pm »

Quote from: Chavi on March 05, 2010, 09:35:47 pm

$\overrightarrow{D E} = \frac{1}{5}\overrightarrow{A D}$
therefore $AD : DE = 5:1$

Also on this line, you should write it as:

$AD:DE= (5-1):1$ so $4:1$ , not $5:1$ as that has 6 parts. I usually think of it as a jumping bean along the line, and then you move 4 equal jumps and then get one more.

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Author Topic: Vector extended response ratio (Read 1052 times) Tweet Share

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