Solved: Find the length AB.

ttokoro · ‎Mar 23, 2024

Elementary schoole children can solve this puzzle. If you need you can use Mathcad Prime.

terryhendicott · ‎Mar 23, 2024

View solution in original post

AlfredFlaßhaar · ‎Mar 23, 2024

There are two intermediate solutions. In the end AB=11 in any case 😉

terryhendicott · ‎Mar 23, 2024

ttokoro · ‎Mar 23, 2024

If we use Mathcad it is easy to find the answer. But without sqrt or functions, this puzzle becomes very hard.

AlfredFlaßhaar · ‎Mar 24, 2024

This task is not particularly difficult. Students should be able to solve it using the cosine law for side length and the sine formula for the area of a triangle. What is much more interesting about this problem is that solution "11" is possible in two different geometric situations.

terryhendicott · ‎Mar 24, 2024

Hi,

Prime 9 Express version:

Cheers

Terry

AlfredFlaßhaar · ‎Mar 24, 2024

The two solutions are AD=14.354..., BC=11.822... and AD=5.911..., BC=28.709...
They are approximations for unpleasant radicals.

AlfredFlaßhaar · ‎Mar 24, 2024

BTW.
Numerical solutions attached. How do you solve the system symbolically? Need help.

AlfredFlaßhaar · ‎Mar 24, 2024

Now it runs 🙂 .

AlfredFlaßhaar · ‎Mar 25, 2024

Korrektur!

ttokoro · ‎Apr 05, 2024

My answer is.

AlfredFlaßhaar · ‎Apr 01, 2024

Additional task: 😉

Given pieces and requirements as usual.

But:

Instead of the given area F=60, the distance AC must now be calculated so that the area of the triangle ABC is maximum. How big is the interior angle at C?

AlfredFlaßhaar · ‎Apr 02, 2024

Correction:
With the unusual names of the triangle vertices as shown in the sketch in the original problem, the distance AB is logically sought. I accidentally had the usual point designation in my head, where A and B limit the lower side of the triangle and C is the summit.

Werner_E · ‎Apr 04, 2024

I would solve it that way:

Using Mathcads solving and plotting facilities it may look like this:

Mathcad 15 sheet attached