Draft:Elwasif's Proof

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Submission declined on 21 September 2024 by KylieTastic (talk). This draft's references do not show that the subject qualifies for a Wikipedia article. In summary, the draft needs multiple published sources that are: in-depth (not just passing mentions about the subject) reliable secondary independent of the subject Make sure you add references that meet these criteria before resubmitting. Learn about mistakes to avoid when addressing this issue. If no additional references exist, the subject is not suitable for Wikipedia. Declined by KylieTastic 45 days ago.

Submission declined on 10 August 2024 by S0091 (talk). This submission is not adequately supported by reliable sources. Reliable sources are required so that information can be verified. If you need help with referencing, please see Referencing for beginners and Citing sources. This draft's references do not show that the subject qualifies for a Wikipedia article. In summary, the draft needs multiple published sources that are: in-depth (not just passing mentions about the subject) reliable secondary independent of the subject Make sure you add references that meet these criteria before resubmitting. Learn about mistakes to avoid when addressing this issue. If no additional references exist, the subject is not suitable for Wikipedia. Declined by S0091 2 months ago.

• Comment: No sources for the actual proof, no sources for the other claims KylieTastic (talk) 12:26, 21 September 2024 (UTC)

The median of a trapezoid is a segment that joins the midpoints of the non-parallel sides.^[1] This article presents a proof of the Median of the Trapezoid Theorem, developed by Moustafa Elwasif, which states that the median is half the sum of the lengths of the trapezoid's bases.^[2] This theorem has practical significance in geometry for its simple yet powerful relationship.

Background:

In geometry, a trapezoid (or trapezium) is a quadrilateral with at least one pair of parallel sides called bases. The median, also known as the midsegment, is a crucial element in the study of trapezoids due to its unique properties.

Statement of the Proof:

The Median of the Trapezoid Theorem asserts: ${\displaystyle {m=}{(a+b) \over 2}}$​ where ${\displaystyle m}$ is the length of the median, and ${\displaystyle a}$ and ${\displaystyle b}$ are the lengths of the bases.

Methodology:

The proof involves defining a variable ${\displaystyle k}$ that represents the difference between the median and either base ${\displaystyle a}$ or ${\displaystyle b}$. The relationships are expressed as: ${\displaystyle k=(b-m),(m-a),({b-a \over 2})}$

From these relationships, the expressions for ${\displaystyle a}$, ${\displaystyle b}$, and ${\displaystyle m}$ are derived:

${\displaystyle b=(m+k),(a+2k)}$

${\displaystyle a=(m-k),(b-2k)}$

${\displaystyle m=(b-k),(a+k)}$

Verification:

By substituting ${\displaystyle m={a+b \over 2}}$​ into the expressions for ${\displaystyle k}$ and simplifying, the equality of these relationships is confirmed, thus proving the theorem.

Authorship and Development:

The Proof for the Median of the Trapezoid Theorem was developed by Moustafa Elwasif at the age of 15, in 2016. The idea originated during a geometry test that was created and graded by Prof. Mohammad Jarkas. He pointed out that the solution Moustafa wrote on the test paper was achieved through a method that was unheard of and said after a brief examination that it could be a potential proof.

During March 2023, Dr. Prof. Samuel Moveh agreed to examine this proof, then and confirmed its validity in November 2023, suggesting that it should be published.

Significance and Impact:

This theorem is significant in the study of trapezoids as it provides a simple yet powerful relationship between the bases and the median. It is widely used in various geometrical applications and problems. The theorem's simplicity makes it a useful tool in various geometrical applications, particularly in solving problems related to trapezoidal shapes in both academic and practical contexts.