\left| \begin{array} { r r r } { 11 } & { - 2 } & { 1 } \\ { 17 } & { 3 } & { 0 } \\ { 1 } & { - 2 } & { 6 } \end{array} \right|
Baholash
365
Omil
5\times 73
Baham ko'rish
Klipbordga nusxa olish
det(\left(\begin{matrix}11&-2&1\\17&3&0\\1&-2&6\end{matrix}\right))
Diagonal usulidan foydalanib matritsaning aniqlovchisini topish.
\left(\begin{matrix}11&-2&1&11&-2\\17&3&0&17&3\\1&-2&6&1&-2\end{matrix}\right)
Birinchi ikki ustunni to'rtinchi va beshinchi ustun sifatida qaytarish uchun asl matritsani kengaytirish.
11\times 3\times 6+17\left(-2\right)=164
Pastki chap kiritmadan boshlab diagonal kamayish tarafga ko'paytirish ha koʻpaytmalarni qo'shish.
3+6\times 17\left(-2\right)=-201
Pastki chap kiritmadan boshlab diagonal ko'payish tarafga koʻpaytirish va koʻpaytmalarni qoʻshish.
164-\left(-201\right)
Kamayib boruvchi diagonal koʻpaytmalarning yig'indisidan ko'payib boruvchi diagonal koʻpaytmalar yig'indisini ayirish.
365
164 dan -201 ni ayirish.
det(\left(\begin{matrix}11&-2&1\\17&3&0\\1&-2&6\end{matrix}\right))
Kichik a'zolarni kengaytirish usulidan foydalanib matritsaning aniqlovchisini topish (ko'paytiruvchilarni kengaytirish deb ham nomlanadi).
11det(\left(\begin{matrix}3&0\\-2&6\end{matrix}\right))-\left(-2det(\left(\begin{matrix}17&0\\1&6\end{matrix}\right))\right)+det(\left(\begin{matrix}17&3\\1&-2\end{matrix}\right))
Kichik a’zolarga kengaytirish uchun birinchi satrning har bir elementini o‘zining kichik a’zosiga ko‘paytiring, qaysiki ana shu elementga ega bo‘lgan satr va ustunni yo‘q qilish orqali yaratilgan 2\times 2 matritsasining maxraji hisoblanadi, so‘ngra elementning joylashuv belgisiga ko‘paytiring.
11\times 3\times 6-\left(-2\times 17\times 6\right)+17\left(-2\right)-3
\left(\begin{matrix}a&b\\c&d\end{matrix}\right) 2\times 2 matritsasi uchun, determinant ad-bc.
11\times 18-\left(-2\times 102\right)-37
Qisqartirish.
365
Yakuniy natija olish uchun shartlarni qo'shish.
Misollar
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Chiziqli tenglama
y = 3x + 4
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Matritsa
\left[ \begin{array} { l l } { 2 } & { 3 } \\ { 5 } & { 4 } \end{array} \right] \left[ \begin{array} { l l l } { 2 } & { 0 } & { 3 } \\ { -1 } & { 1 } & { 5 } \end{array} \right]
Simli tenglama
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Oʻngga
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Chegaralar
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