Geometry; similar shapes

paulb203 · 2025-07-14 04:50:18

Why are there two possible values of x?

Here's what I've done so far.

AE(SF)=AD
12(SF)=15
SF=15/12
=5/4

AB(SF)=AC
8(5/4)=AC
AC=10

AC-AB=x
x=10-8
x=2

A hint please, as to my next step

Bob · 2025-07-15 00:17:08

That's what I did at first.

But the question doesn't say that ADC is an enlargement of AEB, just that the triangles are similar.

So it could be that ACD is an enlargement of AEB. That leads to a second scale factor and hence answer for x.

Important lesson for any maths question with a diagram: Don't make assumptions because of the way the diagram has been drawn.

Bob

paulb203 · 2025-07-15 05:50:45

Thank, Bob.

What's the difference between ADC and ACD?

I'm wondering why they aren't two ways of labelling the same thing, like we could call/label a square ABCD, going from, say, top left, clockwise through B,C and D. Or we could call/label the same square DCBA, going from bottom left, anti-clockwise through C,B and A. Is that correct?

What am I missing regards ADC v ACD

They look to me like the same shape, the same triangle, the former being labelled anti-clockwise, the latter clock-wise. But obviously I'm missing something

Or maybe I'm just confused about the very basics of this kind of thing?

Bob · 2025-07-15 19:47:53

We have a slightly different way of tackling this question. It comes to the same thing, but my way shows how I got two answers.

When I have two triangles that are similar I write them like this:

AEB
ADC

What this means is that A is common to both; D is the enlargement of E and C is the enlargement of B.

The ratio of a side in the larger to the matching side in the smaller will be equal to the ratio of another pair. (equals the enlargement factor)

ie. AC/AB = AD/AE. This leads to your calculation and hence solves for x.

But that assumes that CD is parallel to BE. It looks right but the question doesn't specifically say so.

A is obviously common but maybe angle ACD = AEB which still leads to similar triangles but with the second answer.

My notation for this case is

ACD
AEB

Now I can pick out the alternative ratios

AC/ AE = AD/AB

and form a second equation for x.

Bob

paulb203 · 2025-07-16 04:51:47

Thanks, Bob.

“But that assumes that CD is parallel to BE. It looks right but the question doesn't specifically say so.”
I’ve had another look; it doesn’t actually look parallel.

“A is obviously common but maybe angle ACD = AEB which still leads to similar triangles but with the second answer.”
So E would be the top of the triangle?
Do we rotate the small triangle anti-clockwise until its base is BA?

“My notation for this case is
ACD
AEB”

That makes me think we don’t rotate the small triangle anti-clockwise until its base is BA.
Maybe we flip AEB on its head, as it were, to put E at the top, with A still at the bottom left?
“Now I can pick out the alternative ratios
AC/ AE = AD/AB
and form a second equation for x.”

To find Scale Factor (SF):

(8+x)/(12) = (15)/(8) ?
8x=12
x=12/8
x=3/2
SF=3/2

**

15(3/2)=22.5
22.5-8=14.5
x=14.5 ?

Bob · 2025-07-16 21:30:40

That's what I got!

Bob

paulb203 · Yesterday 06:49:45

Cheers, Bob.

I've now looked at the answer and Maths Genie agrees

Math Is Fun Forum

#1 2025-07-14 04:50:18

Geometry; similar shapes

#2 2025-07-15 00:17:08

Re: Geometry; similar shapes

#3 2025-07-15 05:50:45

Re: Geometry; similar shapes

#4 2025-07-15 19:47:53

Re: Geometry; similar shapes

#5 2025-07-16 04:51:47

Re: Geometry; similar shapes

#6 2025-07-16 21:30:40

Re: Geometry; similar shapes

#7 Yesterday 06:49:45

Re: Geometry; similar shapes

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