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الصيغ الصريحة (Info)


بكتابة Nk للعدد المثلثي التربيعي kوبكتابة sk وtk لأطراف التربيع والتكعيب المقابلة بالصورة

عرف الجذر المثلثي للعدد المثلثي على أنه . من التعريف ومن الصيغة التربيعية لذلك، يكون مثلثي إذا وإذا كان فقط تربيعيا. بناء عليه، يكون تربيعيا ومثلثيا إذا وإذا كان فقط تربيعيا، بعبارة أخرى، توجد أعداد و بحيث . هذه صورة من معادلة بيل مع . جميع معادلات بيل لها حلول بديهية لأي قيمة n، يدعى هذا الحل بالصفري ويفهرس . إذا كان يرمز إلى الحل اللابديهي k لأي معادلة بيل لقيمة محدد n، فيمكن تبيان أن و . بالتالي هناك لانهاية من الحلول لأي معادلة بيل بحيث لها حل لابديهي محقق كلما كانت n غير مربعة. الحل اللابديهي الأول عندما n=8 سهل الإيجاد: إنه (3,1). الحل لمعادلة بيل عندما n=8 ينتج عدد مثلثي تربيعي وجذورة التربيعية والمثلثية: و بالتالي، العدد المثلثي التربيعية الأول، مشتق من (3,1), is 1، والثاني مشتق من (17,6) (=6×(3,1)-(1,0)), هو 36.

في 1778 استطاع ليونارد أويلر إيجاد الصيغة الصريحة

من الصيغ الأخرى المكافئة (نحصل عليها من نشر هذه الصيغة) التي قد تكون مناسبة

الصيغ الصريحة المقابلة لـ sk وtk هي

و

Source: wikipedia.org
Public Domain
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Dictionary Of Verbs Whose Non-explicit Object Has Been Omitted In The Noble Qur’an

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Dispensing Made Easy: With Numerous Formulae, And Practical Hints To Secure Simplicity, Rapidity, And Economy;

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Abbreviation Of Sahih Al-bukhari (explicit Abstraction) [yellow]

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Abbreviated Sahih Al-bukhari (explicit Abstraction) [white]

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Catalan's Constant [Ramanujan's Formula]

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Contract Formats
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