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صيغة كاردانو (Info)


كاردانو هو عالم رياضيات وفيزيائي وفلكي إيطالي. نشر هذه الصيغة في كتابه أرس ماغنا عام 1545 م.

تقتضي الطريقة :

  • أولا تبسيط المعادلة القياسية لتصبح على الشكل
. قد يسمى هذا الشكل من الحدوديات متعددات حدود واحدية المدخل.
  • ثم التخلص من معامل الدرجة الثانية باستخدام التعويض المناسب لتصبح المعادلة بالشكل الجديد:

حيث

  • وبتعويض مناسب : في المعادلة (2) يمكن الحصول على:
  • وهنا افترض كاردان حدا جديدا للمتغيرات u وv بحيث
  • عند دمج هذه في (3) بتعويض v نحصل على:
  • هذه معادلة من الدرجة السادسة يمكن أن تبسط إلى الدرجة الثانية في u3 وتحل مباشرة. مميزها هو . دراسة إشارة هذا المميز تعطي ثلاث حالات.

Δ موجب قطعا

وبالتالي:

الحل الحقيقي الوحيد هو .

و حلان عقديان مترافقان:

حيث

Δ سالب قطعا

يوجد عدد عقدي u الذي هو جذر مكعب ل .

المعادلة تقبل ثلاث حلول حقيقية:

انظر إلى حالة غير قابلة للتبسيط (معادلات تكعيبية).

  • ولما كانت t = v + u, t = x + a/3, وv = −p/3u, نجد

أن:

لاحظ أنه يوجد ثلاث حالات لحساب u في (4) وثلاث حالات لحساب v. ذلك لأن الجذر التكعيبي يحمل ثلاث احتمالات.

أولا، إذا كانت p = q = 0, فإنه لدينا ثلاثة جذور حقيقية
ثانيا، إذا كانت p = 0 وq ≠ 0, فإن:
ثالثا إذا كانت p ≠ 0 وq = 0 فإن:
وفي أي من الحالات تكون الجذور الثلاثة هي:
حيث

طريقة كاردان هي طريقة تمكن من حل جميع المعادلات من الدرجة الثالثة.

هذه الطريقة تكمن من استعمال صيغ كاردان المعطاة بدلالة و حلول المعادلة: . وهي تمكن من البرهنة على أن المعادلات من الدرجة 3 يمكن حلها جبريا.

Δ مساو للصفر

قد تدمج هذه الحالة في حالة المميز الموجب. وقد تدمج أيضا في حالة الميز السالب. النتيجة لا تتغير. بتعويض Δ بقيمته المساوية للصفر في المعادلات السابقة الذكر، يصير للمعادلة حلا حقيقيا بسيطا هو وحل حقيقيا مزدوجا هو .

Source: wikipedia.org
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