الرياضيات المتناهية الأمثلة

⎡ ⎢ ⎣ \begin{matrix} 1 & 1 & 1 3 & 1 & - 3 1 & - 2 & - 5 \end{matrix} ⎤ ⎥ ⎦

$[\begin{array}{c} 1 & 1 & 1 \\ 3 & 1 & - 3 \\ 1 & - 2 & - 5 \end{array}]$

خطوة 1

اكتب المصفوفة كحاصل مصفوفة مثلثية سفلية ومصفوفة مثلثية علوية.

⎡ ⎢ ⎣ \begin{matrix} 1 & 0 & 0 l_{21} & 1 & 0 l_{31} & l_{32} & 1 \end{matrix} ⎤ ⎥ ⎦ ⎡ ⎢ ⎣ \begin{matrix} u_{11} & u_{12} & u_{13} 0 & u_{22} & u_{23} 0 & 0 & u_{33} \end{matrix} ⎤ ⎥ ⎦ = ⎡ ⎢ ⎣ \begin{matrix} 1 & 1 & 1 3 & 1 & - 3 1 & - 2 & - 5 \end{matrix} ⎤ ⎥ ⎦

$[\begin{array}{c} 1 & 0 & 0 \\ l_{21} & 1 & 0 \\ l_{31} & l_{32} & 1 \end{array}] [\begin{array}{c} u_{11} & u_{12} & u_{13} \\ 0 & u_{22} & u_{23} \\ 0 & 0 & u_{33} \end{array}] = [\begin{array}{c} 1 & 1 & 1 \\ 3 & 1 & - 3 \\ 1 & - 2 & - 5 \end{array}]$

خطوة 2

اضرب

⎡ ⎢ ⎣ \begin{matrix} 1 & 0 & 0 l_{21} & 1 & 0 l_{31} & l_{32} & 1 \end{matrix} ⎤ ⎥ ⎦ ⎡ ⎢ ⎣ \begin{matrix} u_{11} & u_{12} & u_{13} 0 & u_{22} & u_{23} 0 & 0 & u_{33} \end{matrix} ⎤ ⎥ ⎦

$[\begin{array}{c} 1 & 0 & 0 \\ l_{21} & 1 & 0 \\ l_{31} & l_{32} & 1 \end{array}] [\begin{array}{c} u_{11} & u_{12} & u_{13} \\ 0 & u_{22} & u_{23} \\ 0 & 0 & u_{33} \end{array}]$ .

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خطوة 2.1

يمكن ضرب مصفوفتين إذا كان عدد الأعمدة في المصفوفة الأولى يساوي عدد الصفوف في المصفوفة الثانية فقط. في هذه الحالة، المصفوفة الأولى هي

3 \times 3

$3 \times 3$ والمصفوفة الثانية هي

3 \times 3

$3 \times 3$ .

خطوة 2.2

اضرب كل صف في المصفوفة الأولى في كل عمود في المصفوفة الثانية.

⎡ ⎢ ⎣ \begin{matrix} 1 u_{11} + 0 \cdot 0 + 0 \cdot 0 & 1 u_{12} + 0 u_{22} + 0 \cdot 0 & 1 u_{13} + 0 u_{23} + 0 u_{33} l_{21} u_{11} + 1 \cdot 0 + 0 \cdot 0 & l_{21} u_{12} + 1 u_{22} + 0 \cdot 0 & l_{21} u_{13} + 1 u_{23} + 0 u_{33} l_{31} u_{11} + l_{32} \cdot 0 + 1 \cdot 0 & l_{31} u_{12} + l_{32} u_{22} + 1 \cdot 0 & l_{31} u_{13} + l_{32} u_{23} + 1 u_{33} \end{matrix} ⎤ ⎥ ⎦ = ⎡ ⎢ ⎣ \begin{matrix} 1 & 1 & 1 3 & 1 & - 3 1 & - 2 & - 5 \end{matrix} ⎤ ⎥ ⎦

$[\begin{array}{c} 1 u_{11} + 0 \cdot 0 + 0 \cdot 0 & 1 u_{12} + 0 u_{22} + 0 \cdot 0 & 1 u_{13} + 0 u_{23} + 0 u_{33} \\ l_{21} u_{11} + 1 \cdot 0 + 0 \cdot 0 & l_{21} u_{12} + 1 u_{22} + 0 \cdot 0 & l_{21} u_{13} + 1 u_{23} + 0 u_{33} \\ l_{31} u_{11} + l_{32} \cdot 0 + 1 \cdot 0 & l_{31} u_{12} + l_{32} u_{22} + 1 \cdot 0 & l_{31} u_{13} + l_{32} u_{23} + 1 u_{33} \end{array}] = [\begin{array}{c} 1 & 1 & 1 \\ 3 & 1 & - 3 \\ 1 & - 2 & - 5 \end{array}]$

خطوة 2.3

بسّط كل عنصر من عناصر المصفوفة بضرب جميع العبارات.

⎡ ⎢ ⎣ \begin{matrix} u_{11} & u_{12} & u_{13} l_{21} u_{11} & l_{21} u_{12} + u_{22} & l_{21} u_{13} + u_{23} l_{31} u_{11} & l_{31} u_{12} + l_{32} u_{22} & l_{31} u_{13} + l_{32} u_{23} + u_{33} \end{matrix} ⎤ ⎥ ⎦ = ⎡ ⎢ ⎣ \begin{matrix} 1 & 1 & 1 3 & 1 & - 3 1 & - 2 & - 5 \end{matrix} ⎤ ⎥ ⎦

$[\begin{array}{c} u_{11} & u_{12} & u_{13} \\ l_{21} u_{11} & l_{21} u_{12} + u_{22} & l_{21} u_{13} + u_{23} \\ l_{31} u_{11} & l_{31} u_{12} + l_{32} u_{22} & l_{31} u_{13} + l_{32} u_{23} + u_{33} \end{array}] = [\begin{array}{c} 1 & 1 & 1 \\ 3 & 1 & - 3 \\ 1 & - 2 & - 5 \end{array}]$

⎡ ⎢ ⎣ \begin{matrix} u_{11} & u_{12} & u_{13} l_{21} u_{11} & l_{21} u_{12} + u_{22} & l_{21} u_{13} + u_{23} l_{31} u_{11} & l_{31} u_{12} + l_{32} u_{22} & l_{31} u_{13} + l_{32} u_{23} + u_{33} \end{matrix} ⎤ ⎥ ⎦ = ⎡ ⎢ ⎣ \begin{matrix} 1 & 1 & 1 3 & 1 & - 3 1 & - 2 & - 5 \end{matrix} ⎤ ⎥ ⎦

خطوة 3

أوجِد الحل.

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خطوة 3.1

اكتب في صورة نظام خطي من المعادلات.

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

l_{21} u_{11} = 3

$l_{21} u_{11} = 3$

l_{21} u_{12} + u_{22} = 1

$l_{21} u_{12} + u_{22} = 1$

l_{21} u_{13} + u_{23} = - 3

$l_{21} u_{13} + u_{23} = - 3$

l_{31} u_{11} = 1

$l_{31} u_{11} = 1$

l_{31} u_{12} + l_{32} u_{22} = - 2

$l_{31} u_{12} + l_{32} u_{22} = - 2$

l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5

$l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5$

خطوة 3.2

أوجِد حل سلسلة المعادلات.

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خطوة 3.2.1

استبدِل كافة حالات حدوث

u_{11}

$u_{11}$ بـ

1

$1$ في كل معادلة.

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خطوة 3.2.1.1

استبدِل كافة حالات حدوث

u_{11}

$u_{11}$ في

l_{21} u_{11} = 3

$l_{21} u_{11} = 3$ بـ

1

$1$ .

l_{21} \cdot 1 = 3

$l_{21} \cdot 1 = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

l_{21} u_{12} + u_{22} = 1

$l_{21} u_{12} + u_{22} = 1$

l_{21} u_{13} + u_{23} = - 3

$l_{21} u_{13} + u_{23} = - 3$

l_{31} u_{11} = 1

$l_{31} u_{11} = 1$

l_{31} u_{12} + l_{32} u_{22} = - 2

$l_{31} u_{12} + l_{32} u_{22} = - 2$

l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5

$l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5$

خطوة 3.2.1.2

بسّط الطرف الأيسر.

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خطوة 3.2.1.2.1

اضرب

l_{21}

$l_{21}$ في

1

$1$ .

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

l_{21} u_{12} + u_{22} = 1

$l_{21} u_{12} + u_{22} = 1$

l_{21} u_{13} + u_{23} = - 3

$l_{21} u_{13} + u_{23} = - 3$

l_{31} u_{11} = 1

$l_{31} u_{11} = 1$

l_{31} u_{12} + l_{32} u_{22} = - 2

$l_{31} u_{12} + l_{32} u_{22} = - 2$

l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5

$l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

l_{21} u_{12} + u_{22} = 1

$l_{21} u_{12} + u_{22} = 1$

l_{21} u_{13} + u_{23} = - 3

$l_{21} u_{13} + u_{23} = - 3$

l_{31} u_{11} = 1

$l_{31} u_{11} = 1$

l_{31} u_{12} + l_{32} u_{22} = - 2

$l_{31} u_{12} + l_{32} u_{22} = - 2$

l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5

$l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5$

خطوة 3.2.1.3

استبدِل كافة حالات حدوث

u_{11}

$u_{11}$ في

l_{31} u_{11} = 1

$l_{31} u_{11} = 1$ بـ

1

$1$ .

l_{31} \cdot 1 = 1

$l_{31} \cdot 1 = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

l_{21} u_{12} + u_{22} = 1

$l_{21} u_{12} + u_{22} = 1$

l_{21} u_{13} + u_{23} = - 3

$l_{21} u_{13} + u_{23} = - 3$

l_{31} u_{12} + l_{32} u_{22} = - 2

$l_{31} u_{12} + l_{32} u_{22} = - 2$

l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5

$l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5$

خطوة 3.2.1.4

بسّط الطرف الأيسر.

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خطوة 3.2.1.4.1

اضرب

l_{31}

$l_{31}$ في

1

$1$ .

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

l_{21} u_{12} + u_{22} = 1

$l_{21} u_{12} + u_{22} = 1$

l_{21} u_{13} + u_{23} = - 3

$l_{21} u_{13} + u_{23} = - 3$

l_{31} u_{12} + l_{32} u_{22} = - 2

$l_{31} u_{12} + l_{32} u_{22} = - 2$

l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5

$l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

l_{21} u_{12} + u_{22} = 1

$l_{21} u_{12} + u_{22} = 1$

l_{21} u_{13} + u_{23} = - 3

$l_{21} u_{13} + u_{23} = - 3$

l_{31} u_{12} + l_{32} u_{22} = - 2

$l_{31} u_{12} + l_{32} u_{22} = - 2$

l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5

$l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

l_{21} u_{12} + u_{22} = 1

$l_{21} u_{12} + u_{22} = 1$

l_{21} u_{13} + u_{23} = - 3

$l_{21} u_{13} + u_{23} = - 3$

l_{31} u_{12} + l_{32} u_{22} = - 2

$l_{31} u_{12} + l_{32} u_{22} = - 2$

l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5

$l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5$

خطوة 3.2.2

استبدِل كافة حالات حدوث

l_{31}

$l_{31}$ بـ

1

$1$ في كل معادلة.

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خطوة 3.2.2.1

استبدِل كافة حالات حدوث

l_{31}

$l_{31}$ في

l_{31} u_{12} + l_{32} u_{22} = - 2

$l_{31} u_{12} + l_{32} u_{22} = - 2$ بـ

1

$1$ .

1 \cdot u_{12} + l_{32} u_{22} = - 2

$1 \cdot u_{12} + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

l_{21} u_{12} + u_{22} = 1

$l_{21} u_{12} + u_{22} = 1$

l_{21} u_{13} + u_{23} = - 3

$l_{21} u_{13} + u_{23} = - 3$

l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5

$l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5$

خطوة 3.2.2.2

بسّط الطرف الأيسر.

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خطوة 3.2.2.2.1

اضرب

u_{12}

$u_{12}$ في

1

$1$ .

u_{12} + l_{32} u_{22} = - 2

$u_{12} + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

l_{21} u_{12} + u_{22} = 1

$l_{21} u_{12} + u_{22} = 1$

l_{21} u_{13} + u_{23} = - 3

$l_{21} u_{13} + u_{23} = - 3$

l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5

$l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5$

u_{12} + l_{32} u_{22} = - 2

$u_{12} + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

l_{21} u_{12} + u_{22} = 1

$l_{21} u_{12} + u_{22} = 1$

l_{21} u_{13} + u_{23} = - 3

$l_{21} u_{13} + u_{23} = - 3$

l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5

$l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5$

خطوة 3.2.2.3

استبدِل كافة حالات حدوث

l_{31}

$l_{31}$ في

l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5

$l_{31} u_{13} + l_{32} u_{23} + u_{33} = - 5$ بـ

1

$1$ .

1 \cdot u_{13} + l_{32} u_{23} + u_{33} = - 5

$1 \cdot u_{13} + l_{32} u_{23} + u_{33} = - 5$

u_{12} + l_{32} u_{22} = - 2

$u_{12} + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

l_{21} u_{12} + u_{22} = 1

$l_{21} u_{12} + u_{22} = 1$

l_{21} u_{13} + u_{23} = - 3

$l_{21} u_{13} + u_{23} = - 3$

خطوة 3.2.2.4

بسّط الطرف الأيسر.

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خطوة 3.2.2.4.1

اضرب

u_{13}

$u_{13}$ في

1

$1$ .

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

u_{12} + l_{32} u_{22} = - 2

$u_{12} + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

l_{21} u_{12} + u_{22} = 1

$l_{21} u_{12} + u_{22} = 1$

l_{21} u_{13} + u_{23} = - 3

$l_{21} u_{13} + u_{23} = - 3$

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

u_{12} + l_{32} u_{22} = - 2

$u_{12} + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

l_{21} u_{12} + u_{22} = 1

$l_{21} u_{12} + u_{22} = 1$

l_{21} u_{13} + u_{23} = - 3

$l_{21} u_{13} + u_{23} = - 3$

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

u_{12} + l_{32} u_{22} = - 2

$u_{12} + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

l_{21} u_{12} + u_{22} = 1

$l_{21} u_{12} + u_{22} = 1$

l_{21} u_{13} + u_{23} = - 3

$l_{21} u_{13} + u_{23} = - 3$

خطوة 3.2.3

استبدِل كافة حالات حدوث

l_{21}

$l_{21}$ بـ

3

$3$ في كل معادلة.

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خطوة 3.2.3.1

استبدِل كافة حالات حدوث

l_{21}

$l_{21}$ في

l_{21} u_{12} + u_{22} = 1

$l_{21} u_{12} + u_{22} = 1$ بـ

3

$3$ .

3 \cdot u_{12} + u_{22} = 1

$3 \cdot u_{12} + u_{22} = 1$

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

u_{12} + l_{32} u_{22} = - 2

$u_{12} + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

l_{21} u_{13} + u_{23} = - 3

$l_{21} u_{13} + u_{23} = - 3$

خطوة 3.2.3.2

بسّط الطرف الأيسر.

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خطوة 3.2.3.2.1

اضرب

3

$3$ في

u_{12}

$u_{12}$ .

3 u_{12} + u_{22} = 1

$3 u_{12} + u_{22} = 1$

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

u_{12} + l_{32} u_{22} = - 2

$u_{12} + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

l_{21} u_{13} + u_{23} = - 3

$l_{21} u_{13} + u_{23} = - 3$

3 u_{12} + u_{22} = 1

$3 u_{12} + u_{22} = 1$

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

u_{12} + l_{32} u_{22} = - 2

$u_{12} + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

l_{21} u_{13} + u_{23} = - 3

$l_{21} u_{13} + u_{23} = - 3$

خطوة 3.2.3.3

استبدِل كافة حالات حدوث

l_{21}

$l_{21}$ في

l_{21} u_{13} + u_{23} = - 3

$l_{21} u_{13} + u_{23} = - 3$ بـ

3

$3$ .

3 \cdot u_{13} + u_{23} = - 3

$3 \cdot u_{13} + u_{23} = - 3$

3 u_{12} + u_{22} = 1

$3 u_{12} + u_{22} = 1$

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

u_{12} + l_{32} u_{22} = - 2

$u_{12} + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

خطوة 3.2.3.4

بسّط الطرف الأيسر.

انقر لعرض المزيد من الخطوات...

خطوة 3.2.3.4.1

اضرب

3

$3$ في

u_{13}

$u_{13}$ .

3 u_{13} + u_{23} = - 3

$3 u_{13} + u_{23} = - 3$

3 u_{12} + u_{22} = 1

$3 u_{12} + u_{22} = 1$

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

u_{12} + l_{32} u_{22} = - 2

$u_{12} + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

3 u_{13} + u_{23} = - 3

$3 u_{13} + u_{23} = - 3$

3 u_{12} + u_{22} = 1

$3 u_{12} + u_{22} = 1$

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

u_{12} + l_{32} u_{22} = - 2

$u_{12} + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

3 u_{13} + u_{23} = - 3

$3 u_{13} + u_{23} = - 3$

3 u_{12} + u_{22} = 1

$3 u_{12} + u_{22} = 1$

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

u_{12} + l_{32} u_{22} = - 2

$u_{12} + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

خطوة 3.2.4

استبدِل كافة حالات حدوث

u_{12}

$u_{12}$ بـ

1

$1$ في كل معادلة.

انقر لعرض المزيد من الخطوات...

خطوة 3.2.4.1

استبدِل كافة حالات حدوث

u_{12}

$u_{12}$ في

3 u_{12} + u_{22} = 1

$3 u_{12} + u_{22} = 1$ بـ

1

$1$ .

3 (1) + u_{22} = 1

$3 (1) + u_{22} = 1$

3 u_{13} + u_{23} = - 3

$3 u_{13} + u_{23} = - 3$

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

u_{12} + l_{32} u_{22} = - 2

$u_{12} + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

خطوة 3.2.4.2

بسّط الطرف الأيسر.

انقر لعرض المزيد من الخطوات...

خطوة 3.2.4.2.1

اضرب

3

$3$ في

1

$1$ .

3 + u_{22} = 1

$3 + u_{22} = 1$

3 u_{13} + u_{23} = - 3

$3 u_{13} + u_{23} = - 3$

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

u_{12} + l_{32} u_{22} = - 2

$u_{12} + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

3 + u_{22} = 1

$3 + u_{22} = 1$

3 u_{13} + u_{23} = - 3

$3 u_{13} + u_{23} = - 3$

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

u_{12} + l_{32} u_{22} = - 2

$u_{12} + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

خطوة 3.2.4.3

استبدِل كافة حالات حدوث

u_{12}

$u_{12}$ في

u_{12} + l_{32} u_{22} = - 2

$u_{12} + l_{32} u_{22} = - 2$ بـ

1

$1$ .

1 + l_{32} u_{22} = - 2

$1 + l_{32} u_{22} = - 2$

3 + u_{22} = 1

$3 + u_{22} = 1$

3 u_{13} + u_{23} = - 3

$3 u_{13} + u_{23} = - 3$

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

خطوة 3.2.4.4

بسّط الطرف الأيسر.

انقر لعرض المزيد من الخطوات...

خطوة 3.2.4.4.1

احذِف الأقواس.

1 + l_{32} u_{22} = - 2

$1 + l_{32} u_{22} = - 2$

3 + u_{22} = 1

$3 + u_{22} = 1$

3 u_{13} + u_{23} = - 3

$3 u_{13} + u_{23} = - 3$

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

1 + l_{32} u_{22} = - 2

$1 + l_{32} u_{22} = - 2$

3 + u_{22} = 1

$3 + u_{22} = 1$

3 u_{13} + u_{23} = - 3

$3 u_{13} + u_{23} = - 3$

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

1 + l_{32} u_{22} = - 2

$1 + l_{32} u_{22} = - 2$

3 + u_{22} = 1

$3 + u_{22} = 1$

3 u_{13} + u_{23} = - 3

$3 u_{13} + u_{23} = - 3$

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

خطوة 3.2.5

استبدِل كافة حالات حدوث

u_{13}

$u_{13}$ بـ

1

$1$ في كل معادلة.

انقر لعرض المزيد من الخطوات...

خطوة 3.2.5.1

انقُل كل الحدود التي لا تحتوي على

u_{22}

$u_{22}$ إلى المتعادل الأيمن.

انقر لعرض المزيد من الخطوات...

خطوة 3.2.5.1.1

اطرح

3

$3$ من كلا المتعادلين.

u_{22} = 1 - 3

$u_{22} = 1 - 3$

1 + l_{32} u_{22} = - 2

$1 + l_{32} u_{22} = - 2$

3 u_{13} + u_{23} = - 3

$3 u_{13} + u_{23} = - 3$

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

خطوة 3.2.5.1.2

اطرح

3

$3$ من

1

$1$ .

u_{22} = - 2

$u_{22} = - 2$

1 + l_{32} u_{22} = - 2

$1 + l_{32} u_{22} = - 2$

3 u_{13} + u_{23} = - 3

$3 u_{13} + u_{23} = - 3$

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

u_{22} = - 2

$u_{22} = - 2$

1 + l_{32} u_{22} = - 2

$1 + l_{32} u_{22} = - 2$

3 u_{13} + u_{23} = - 3

$3 u_{13} + u_{23} = - 3$

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

خطوة 3.2.5.2

استبدِل كافة حالات حدوث

u_{13}

$u_{13}$ في

3 u_{13} + u_{23} = - 3

$3 u_{13} + u_{23} = - 3$ بـ

1

$1$ .

3 (1) + u_{23} = - 3

$3 (1) + u_{23} = - 3$

u_{22} = - 2

$u_{22} = - 2$

1 + l_{32} u_{22} = - 2

$1 + l_{32} u_{22} = - 2$

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

خطوة 3.2.5.3

بسّط الطرف الأيسر.

انقر لعرض المزيد من الخطوات...

خطوة 3.2.5.3.1

اضرب

3

$3$ في

1

$1$ .

3 + u_{23} = - 3

$3 + u_{23} = - 3$

u_{22} = - 2

$u_{22} = - 2$

1 + l_{32} u_{22} = - 2

$1 + l_{32} u_{22} = - 2$

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

3 + u_{23} = - 3

$3 + u_{23} = - 3$

u_{22} = - 2

$u_{22} = - 2$

1 + l_{32} u_{22} = - 2

$1 + l_{32} u_{22} = - 2$

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

خطوة 3.2.5.4

استبدِل كافة حالات حدوث

u_{13}

$u_{13}$ في

u_{13} + l_{32} u_{23} + u_{33} = - 5

$u_{13} + l_{32} u_{23} + u_{33} = - 5$ بـ

1

$1$ .

1 + l_{32} u_{23} + u_{33} = - 5

$1 + l_{32} u_{23} + u_{33} = - 5$

3 + u_{23} = - 3

$3 + u_{23} = - 3$

u_{22} = - 2

$u_{22} = - 2$

1 + l_{32} u_{22} = - 2

$1 + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

خطوة 3.2.5.5

بسّط الطرف الأيسر.

انقر لعرض المزيد من الخطوات...

خطوة 3.2.5.5.1

احذِف الأقواس.

1 + l_{32} u_{23} + u_{33} = - 5

$1 + l_{32} u_{23} + u_{33} = - 5$

3 + u_{23} = - 3

$3 + u_{23} = - 3$

u_{22} = - 2

$u_{22} = - 2$

1 + l_{32} u_{22} = - 2

$1 + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

1 + l_{32} u_{23} + u_{33} = - 5

$1 + l_{32} u_{23} + u_{33} = - 5$

3 + u_{23} = - 3

$3 + u_{23} = - 3$

u_{22} = - 2

$u_{22} = - 2$

1 + l_{32} u_{22} = - 2

$1 + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

1 + l_{32} u_{23} + u_{33} = - 5

$1 + l_{32} u_{23} + u_{33} = - 5$

3 + u_{23} = - 3

$3 + u_{23} = - 3$

u_{22} = - 2

$u_{22} = - 2$

1 + l_{32} u_{22} = - 2

$1 + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

خطوة 3.2.6

استبدِل كافة حالات حدوث

u_{22}

$u_{22}$ بـ

- 2

$- 2$ في كل معادلة.

انقر لعرض المزيد من الخطوات...

خطوة 3.2.6.1

انقُل كل الحدود التي لا تحتوي على

u_{23}

$u_{23}$ إلى المتعادل الأيمن.

انقر لعرض المزيد من الخطوات...

خطوة 3.2.6.1.1

اطرح

3

$3$ من كلا المتعادلين.

u_{23} = - 3 - 3

$u_{23} = - 3 - 3$

1 + l_{32} u_{23} + u_{33} = - 5

$1 + l_{32} u_{23} + u_{33} = - 5$

u_{22} = - 2

$u_{22} = - 2$

1 + l_{32} u_{22} = - 2

$1 + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

خطوة 3.2.6.1.2

اطرح

3

$3$ من

- 3

$- 3$ .

u_{23} = - 6

$u_{23} = - 6$

1 + l_{32} u_{23} + u_{33} = - 5

$1 + l_{32} u_{23} + u_{33} = - 5$

u_{22} = - 2

$u_{22} = - 2$

1 + l_{32} u_{22} = - 2

$1 + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

u_{23} = - 6

$u_{23} = - 6$

1 + l_{32} u_{23} + u_{33} = - 5

$1 + l_{32} u_{23} + u_{33} = - 5$

u_{22} = - 2

$u_{22} = - 2$

1 + l_{32} u_{22} = - 2

$1 + l_{32} u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

خطوة 3.2.6.2

استبدِل كافة حالات حدوث

u_{22}

$u_{22}$ في

1 + l_{32} u_{22} = - 2

$1 + l_{32} u_{22} = - 2$ بـ

- 2

$- 2$ .

1 + l_{32} \cdot - 2 = - 2

$1 + l_{32} \cdot - 2 = - 2$

u_{23} = - 6

$u_{23} = - 6$

1 + l_{32} u_{23} + u_{33} = - 5

$1 + l_{32} u_{23} + u_{33} = - 5$

u_{22} = - 2

$u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

خطوة 3.2.6.3

بسّط الطرف الأيسر.

انقر لعرض المزيد من الخطوات...

خطوة 3.2.6.3.1

انقُل

- 2

$- 2$ إلى يسار

l_{32}

$l_{32}$ .

1 - 2 l_{32} = - 2

$1 - 2 l_{32} = - 2$

u_{23} = - 6

$u_{23} = - 6$

1 + l_{32} u_{23} + u_{33} = - 5

$1 + l_{32} u_{23} + u_{33} = - 5$

u_{22} = - 2

$u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

1 - 2 l_{32} = - 2

$1 - 2 l_{32} = - 2$

u_{23} = - 6

$u_{23} = - 6$

1 + l_{32} u_{23} + u_{33} = - 5

$1 + l_{32} u_{23} + u_{33} = - 5$

u_{22} = - 2

$u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

1 - 2 l_{32} = - 2

$1 - 2 l_{32} = - 2$

u_{23} = - 6

$u_{23} = - 6$

1 + l_{32} u_{23} + u_{33} = - 5

$1 + l_{32} u_{23} + u_{33} = - 5$

u_{22} = - 2

$u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

خطوة 3.2.7

استبدِل كافة حالات حدوث

u_{23}

$u_{23}$ بـ

- 6

$- 6$ في كل معادلة.

انقر لعرض المزيد من الخطوات...

خطوة 3.2.7.1

انقُل كل الحدود التي لا تحتوي على

l_{32}

$l_{32}$ إلى المتعادل الأيمن.

انقر لعرض المزيد من الخطوات...

خطوة 3.2.7.1.1

اطرح

1

$1$ من كلا المتعادلين.

- 2 l_{32} = - 2 - 1

$- 2 l_{32} = - 2 - 1$

u_{23} = - 6

$u_{23} = - 6$

1 + l_{32} u_{23} + u_{33} = - 5

$1 + l_{32} u_{23} + u_{33} = - 5$

u_{22} = - 2

$u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

خطوة 3.2.7.1.2

اطرح

1

$1$ من

- 2

$- 2$ .

- 2 l_{32} = - 3

$- 2 l_{32} = - 3$

u_{23} = - 6

$u_{23} = - 6$

1 + l_{32} u_{23} + u_{33} = - 5

$1 + l_{32} u_{23} + u_{33} = - 5$

u_{22} = - 2

$u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

- 2 l_{32} = - 3

$- 2 l_{32} = - 3$

u_{23} = - 6

$u_{23} = - 6$

1 + l_{32} u_{23} + u_{33} = - 5

$1 + l_{32} u_{23} + u_{33} = - 5$

u_{22} = - 2

$u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

خطوة 3.2.7.2

اقسِم كل حد في

- 2 l_{32} = - 3

$- 2 l_{32} = - 3$ على

- 2

$- 2$ وبسّط.

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خطوة 3.2.7.2.1

اقسِم كل حد في

- 2 l_{32} = - 3

$- 2 l_{32} = - 3$ على

- 2

$- 2$ .

\frac{- 2 l_{32}}{- 2} = \frac{- 3}{- 2}

$\frac{- 2 l_{32}}{- 2} = \frac{- 3}{- 2}$

u_{23} = - 6

$u_{23} = - 6$

1 + l_{32} u_{23} + u_{33} = - 5

$1 + l_{32} u_{23} + u_{33} = - 5$

u_{22} = - 2

$u_{22} = - 2$

l_{31} = 1

$l_{31} = 1$

l_{21} = 3

$l_{21} = 3$

u_{11} = 1

$u_{11} = 1$

u_{12} = 1

$u_{12} = 1$

u_{13} = 1

$u_{13} = 1$

خطوة 3.2.7.2.2

بسّط الطرف الأيسر.

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خطوة 3.2.7.2.2.1

ألغِ العامل المشترك لـ

- 2

$- 2$ .

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خطوة 3.2.7.2.2.1.1

ألغِ العامل المشترك.

$\frac{- 2 l_{32}}{- 2} = \frac{- 3}{- 2}$

$u_{23} = - 6$

$1 + l_{32} u_{23} + u_{33} = - 5$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

خطوة 3.2.7.2.2.1.2

اقسِم

$l_{32}$ على

$1$ .

$l_{32} = \frac{- 3}{- 2}$

$u_{23} = - 6$

$1 + l_{32} u_{23} + u_{33} = - 5$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

$l_{32} = \frac{- 3}{- 2}$

$u_{23} = - 6$

$1 + l_{32} u_{23} + u_{33} = - 5$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

$l_{32} = \frac{- 3}{- 2}$

$u_{23} = - 6$

$1 + l_{32} u_{23} + u_{33} = - 5$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

خطوة 3.2.7.2.3

بسّط الطرف الأيمن.

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خطوة 3.2.7.2.3.1

قسمة قيمتين سالبتين على بعضهما البعض ينتج عنها قيمة موجبة.

$l_{32} = \frac{3}{2}$

$u_{23} = - 6$

$1 + l_{32} u_{23} + u_{33} = - 5$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

$l_{32} = \frac{3}{2}$

$u_{23} = - 6$

$1 + l_{32} u_{23} + u_{33} = - 5$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

$l_{32} = \frac{3}{2}$

$u_{23} = - 6$

$1 + l_{32} u_{23} + u_{33} = - 5$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

خطوة 3.2.7.3

استبدِل كافة حالات حدوث

$u_{23}$ في

$1 + l_{32} u_{23} + u_{33} = - 5$ بـ

$- 6$ .

$1 + l_{32} \cdot - 6 + u_{33} = - 5$

$l_{32} = \frac{3}{2}$

$u_{23} = - 6$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

خطوة 3.2.7.4

بسّط الطرف الأيسر.

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خطوة 3.2.7.4.1

انقُل

$- 6$ إلى يسار

$l_{32}$ .

$1 - 6 l_{32} + u_{33} = - 5$

$l_{32} = \frac{3}{2}$

$u_{23} = - 6$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

$1 - 6 l_{32} + u_{33} = - 5$

$l_{32} = \frac{3}{2}$

$u_{23} = - 6$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

$1 - 6 l_{32} + u_{33} = - 5$

$l_{32} = \frac{3}{2}$

$u_{23} = - 6$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

خطوة 3.2.8

استبدِل كافة حالات حدوث

$l_{32}$ بـ

$\frac{3}{2}$ في كل معادلة.

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خطوة 3.2.8.1

استبدِل كافة حالات حدوث

$l_{32}$ في

$1 - 6 l_{32} + u_{33} = - 5$ بـ

$\frac{3}{2}$ .

$1 - 6 (\frac{3}{2}) + u_{33} = - 5$

$l_{32} = \frac{3}{2}$

$u_{23} = - 6$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

خطوة 3.2.8.2

بسّط الطرف الأيسر.

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خطوة 3.2.8.2.1

بسّط

$1 - 6 (\frac{3}{2}) + u_{33}$ .

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خطوة 3.2.8.2.1.1

بسّط كل حد.

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خطوة 3.2.8.2.1.1.1

ألغِ العامل المشترك لـ

$2$ .

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خطوة 3.2.8.2.1.1.1.1

أخرِج العامل

$2$ من

$- 6$ .

$1 + 2 (- 3) (\frac{3}{2}) + u_{33} = - 5$

$l_{32} = \frac{3}{2}$

$u_{23} = - 6$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

خطوة 3.2.8.2.1.1.1.2

ألغِ العامل المشترك.

$1 + 2 \cdot (- 3 (\frac{3}{2})) + u_{33} = - 5$

$l_{32} = \frac{3}{2}$

$u_{23} = - 6$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

خطوة 3.2.8.2.1.1.1.3

أعِد كتابة العبارة.

$1 - 3 \cdot 3 + u_{33} = - 5$

$l_{32} = \frac{3}{2}$

$u_{23} = - 6$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

$1 - 3 \cdot 3 + u_{33} = - 5$

$l_{32} = \frac{3}{2}$

$u_{23} = - 6$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

خطوة 3.2.8.2.1.1.2

اضرب

$- 3$ في

$3$ .

$1 - 9 + u_{33} = - 5$

$l_{32} = \frac{3}{2}$

$u_{23} = - 6$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

$1 - 9 + u_{33} = - 5$

$l_{32} = \frac{3}{2}$

$u_{23} = - 6$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

خطوة 3.2.8.2.1.2

اطرح

$9$ من

$1$ .

$- 8 + u_{33} = - 5$

$l_{32} = \frac{3}{2}$

$u_{23} = - 6$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

$- 8 + u_{33} = - 5$

$l_{32} = \frac{3}{2}$

$u_{23} = - 6$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

$- 8 + u_{33} = - 5$

$l_{32} = \frac{3}{2}$

$u_{23} = - 6$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

$- 8 + u_{33} = - 5$

$l_{32} = \frac{3}{2}$

$u_{23} = - 6$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

خطوة 3.2.9

انقُل كل الحدود التي لا تحتوي على

$u_{33}$ إلى المتعادل الأيمن.

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خطوة 3.2.9.1

أضف

$8$ إلى كلا المتعادلين.

$u_{33} = - 5 + 8$

$l_{32} = \frac{3}{2}$

$u_{23} = - 6$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

خطوة 3.2.9.2

أضف

$- 5$ و

$8$ .

$u_{33} = 3$

$l_{32} = \frac{3}{2}$

$u_{23} = - 6$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

$u_{33} = 3$

$l_{32} = \frac{3}{2}$

$u_{23} = - 6$

$u_{22} = - 2$

$l_{31} = 1$

$l_{21} = 3$

$u_{11} = 1$

$u_{12} = 1$

$u_{13} = 1$

خطوة 3.2.10

أوجِد حل سلسلة المعادلات.

$u_{33} = 3 l_{32} = \frac{3}{2} u_{23} = - 6 u_{22} = - 2 l_{31} = 1 l_{21} = 3 u_{11} = 1 u_{12} = 1 u_{13} = 1$

خطوة 3.2.11

اسرِد جميع الحلول.

$u_{33} = 3, l_{32} = \frac{3}{2}, u_{23} = - 6, u_{22} = - 2, l_{31} = 1, l_{21} = 3, u_{11} = 1, u_{12} = 1, u_{13} = 1$

خطوة 4

عوّض بالقيم المحلولة.

$[\begin{array}{c} 1 & 1 & 1 \\ 3 & 1 & - 3 \\ 1 & - 2 & - 5 \end{array}] = [\begin{array}{c} 1 & 0 & 0 \\ 3 & 1 & 0 \\ 1 & \frac{3}{2} & 1 \end{array}] [\begin{array}{c} 1 & 1 & 1 \\ 0 & - 2 & - 6 \\ 0 & 0 & 3 \end{array}]$

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