Math, asked by uma77, 10 months ago

story on without geometry life is pointless​

Answers

Answered by Anonymous
33

HAYA MATE!

Answer:

Stephen had been a very intelligent student all the time since his childhood; whether to discover the boundary points of the infinitely stretched sine ratio of theta or to count the lillies of the divine sky mathematically, he stood as a frontier most of the times.

Melanie was Stephen's little sister. She always questioned him the secret of his abilities and as usual she loved her brother a lot.

On that very evening, Stephen was walking into their garden. Suddenly he heard the shouting of Melanie and ran into her room. He followed the eyes of her sister and was put to surprise to see an infinitely-shaped object moving around in infinite ways on the ceiling.

The doorbell had rang twice till then. Melanie pressed the remote to welcome the newcomer inside their house; downstairs, they found Dr. Gills himself, professor at the University of California.

- Hello, Doctor. Please, have a seat.

- Yes, my children.

- What can we do for you, Doctor?

- I want to see my "Shapeless" once.

- Shapeless? We are not getting you!

Dr. Gills pressed a switch on his watch and that infinitely-shaped object came downstairs, and started moving as usual.

- It is nothing but a mathematical form of all the known shapes, discovered recently by me.

- That's a very innovative discovery, Doctor. Can you please teach us what it functions?

The then time was quite interesting for both Stephen and Melanie. She was sitting closer to Steve, and was wondering to listen to the story of "Shapeless".

- Geometry is that branch of Mathematics that deals with queries of shape, size, relative position of figures, and the properties of space. As we know that an object can take any geometric form, we can conclude that it can be shaped in infinite ways. But a point arises, whether to construct shapes in real life in infinite ways or just to finite the shapes necessarily? To abide by the properties of resistances inside this spherical earth, our constructional shapes are finite but outside the limitations, Geometry tends to infinity and my "Shapeless" has all thr finite shapes and yet infinitely changeable.

Stephen was listening carefully to the words of Doctor Gills. As soon as he had finished his elaboration, Stephen pointed out a real life situation, stating:

- Life is never pointless without Geometry then; it is only that life is restricted by the properties of finite shapes but if you can reconstruct a life stretching to infinity, Geometry itself will break the bounds to fit in!

When leaving with his "Shapeless", Doctor Albert Gills congratulated Stephen beforehand on becoming a greater mind of the thirteeth century, and Melanie being a great listener (as she fell asleep).

Answered by asifkuet
1

The first semester of pure mathematics focuses on formal two-column and paragraph proofs.  Students tend to struggle understanding the importance and worth of doing proofs in an exceedingly pure mathematics class.  

They aren’t ready to answer the question, ‘Why Proofs?’ or create the affiliation between the logic and deduction needed to finish a proof.  

This semester, I would like students to explore and have interaction with differing kinds and designs of proofs and to read a lot of regarding.

However, the arithmetic world values proofs, even Einstein! conjointly, to envision that proofs aren’t simply a ‘math thing’, however scientists, historians and others use them to influence their audience!

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