Mathematical proof. The sum of a rational number and an irrational number is always an irrational number. || Number theory.

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Personal presentation.

Hello everyone, receive a cordial greeting from me. I am a young mathematician apprentice, Venezuelan and enthusiastic about science in general. At present I am pursuing a "degree in mathematics" career, in which I am in the middle of the degree. On the other hand, I am currently doing research in the area of ​​number theory at the University of Carabobo (UC).

Well, with great pleasure I will be uploading math content, tips to increase your performance in the study and science in general.

I hope you will accompany me on the arduous but beautiful path of mathematics and science.

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Next I proceed to carry out the mathematical proof of the problem in question.

The approach to prove:

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  • Propositional form of the statement:

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  • Start and body of the mathematical proof in question:

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End of the mathematical proof in question. It is necessary to clarify that the mathematical proof was carried out using the method of proof by "reduction to the absurd".

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Video.

i) Explanatory and reinforcement video (video made by me):

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Contact info.

You can follow me at: @paultactico2

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Oh thank you for your support guys. Blessings for you all.

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