Medians and Altitudes

harrychess · 2014-07-22 14:28:35

Help please! An answer and explanation will do.

In quadrilateral ABCD, AB=BC=13, CD=DA=24, and angle D=60. Points X and Y are the midpoints of BC and DA respectively. Compute XY^2 (the square of the length of X).

Last edited by harrychess (2014-07-22 14:52:24)

Bob · 2014-07-25 09:59:40

hi harrychess,

Hmm. Working on it.

So far:

BD is a line of symmetry for the kite. AC is perpendicular to BD and equal to 24. ADB = 30.

In my diagram if Z is at the intersection of XY and BD, it looks like XZ = ZY, but I cannot see why just yet.

Hopefully more will follow when I've caught up from jet lag.

Bob

Bob · 2014-07-26 00:38:55

I think this will do it.

The shape is a kite and BD is the line of symmetry. AC is at right angles to BD.

Z is the point where BD cuts XY. I have also reflected XY in the line BD to create points X' and Y'.

Because of the symmetry YY' = XX' = 12, and both these lines are perpendicular to BD **. Thus X'YY'X is a rectangle and so XZ = XY.

Thus you can get XY by first using Pythag on triangle YY'Z.

Bob

** edit. Certainly YY' = 12 by equilateral triangles. I'm thinking I may be assuming I have 'proved' XX' is also 12 when I may not yet have done so. Just improving my proof now.

Last edited by Bob (2014-07-26 00:47:50)

anonimnystefy · 2014-07-26 00:47:49

Hi Bob

How would you use Pythag on YY'Z? It's not a right triangle.

Bob · 2014-07-26 01:22:54

hi Stefy,

Yes, you're right. The above is flawed. I'm working on a corrected version. At the moment X'YY'X is an isosceles trapezium. I'm sure I had it sorted a while back but I cannot re-trace my steps. I had a way of showing XZ = ZY and that forces the trapezium to become a rectangle. Then you probably have to use cosine rule.

Also DYC = 90. This should help but I need angle YCX.

Thinking still ........................................

Bob

Bob · 2014-07-26 01:29:07

OK. Like this:

AC = 24. Use cosine rule to calculate ABC and hence BCD. Subtract 30 and you have YCB. Then use cosine rule on XYC.

Checking ..........................

Bob

Last edited by Bob (2014-07-26 01:30:55)

Bob · 2014-07-26 01:49:08

A better version.

Because YD = 12 and CD = 24, that makes CYD a 30-60-90 triangle.

Angle ACB can be found thus:

cosine ACB = 12/13 and thus sine ACB = 5/13.

cosine BCD = cosine(BCA + 60) = cosBCA.cos60 - sinBCAsin60 = (12/13 - 5root3/13)/2 = (12 - 5root3)/26

***find sine BCD. Running out of time now, I'll fill this in later.

cosine XCY = cosine(BCD - 30) = cos BCD.cos30 + sinBCD.sin30

Then use cosine rule on XCY.

Note: I've used compound angle formulas to avoid the 'inaccuracy' of using a calculator for these angles.

Bob

anonimnystefy · 2014-07-26 03:00:12

Haven't checked your new solution yet, but XX'YY' is not an isosceles trapezium, it's a parallelogram.

EDIT: Actually, yes, it's both, but calling it a parallelogram is more restrictive.

EDIT #2: And, yes, it is also a rectangle

Last edited by anonimnystefy (2014-07-26 03:07:34)

Bob · 2014-07-26 05:37:16

It is my hope to prove it is a rectangle. So far I have only proved the isosceles trapezium. I am about to tidy up and finish off my method. It will take a little while.

What this space.

Bob

anonimnystefy · 2014-07-26 06:02:59

Well, the opposite sides are equal and parallel...

Bob · 2014-07-26 07:43:32

Stefy wrote:

Well, the opposite sides are equal and parallel...

From my diagram and analysis YY' is parallel to XX' (as both are perpendicular to BD) and X'Y = XY' (by reflection). I don't yet have evidence that X'Y is parallel to XY' nor that X'X = YY'.

But I have simplified my calculations:

Let BCA = a and XCY = b

By simple trig cos(a)=12/13 and sin(a) = 5/13

Therefore, cos(b) = cos(a+30) = cos(a)cos(30) - sin(a)sin(30)= (12root3 -5)/26

Then XY^2 = 144x3 +169/4 -6root3(12root3-5) = 310.2115

This is confirmed by my Sketchpad drawing.

Bob

anonimnystefy · 2014-07-26 08:27:40

All of the edges of XX'YY' are midsegments of respective triangles made by diagonals of the larger quadrilateral.

Bob · 2014-07-27 06:38:28

Arhhh. You say that like it is a theorem I should know. I don't recall ever meeting that one, but that's not surprising as I don't bother to learn theorems. But it was easy to prove, so I'll add it to the list of theorems that I won't bother to learn.

Then it quickly follows that the shape is a rectangle. I expect you can get XY^2 using that, but I don't think I'll bother now. I'll leave it to the interested reader.

Bob

Math Is Fun Forum

#1 2014-07-22 14:28:35

Medians and Altitudes

#2 2014-07-25 09:59:40

Re: Medians and Altitudes

#3 2014-07-26 00:38:55

Re: Medians and Altitudes

#4 2014-07-26 00:47:49

Re: Medians and Altitudes

#5 2014-07-26 01:22:54

Re: Medians and Altitudes

#6 2014-07-26 01:29:07

Re: Medians and Altitudes

#7 2014-07-26 01:49:08

Re: Medians and Altitudes

#8 2014-07-26 03:00:12

Re: Medians and Altitudes

#9 2014-07-26 05:37:16

Re: Medians and Altitudes

#10 2014-07-26 06:02:59

Re: Medians and Altitudes

#11 2014-07-26 07:43:32

Re: Medians and Altitudes

#12 2014-07-26 08:27:40

Re: Medians and Altitudes

#13 2014-07-27 06:38:28

Re: Medians and Altitudes

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