A uchun yechish (complex solution)
\left\{\begin{matrix}A=\frac{CD^{2}}{B\left(D-1\right)}\text{, }&D\neq 1\text{ and }B\neq 0\\A\in \mathrm{C}\text{, }&\left(B=0\text{ and }D=0\right)\text{ or }C=0\end{matrix}\right,
B uchun yechish (complex solution)
\left\{\begin{matrix}B=\frac{CD^{2}}{A\left(D-1\right)}\text{, }&D\neq 1\text{ and }A\neq 0\\B\in \mathrm{C}\text{, }&\left(A=0\text{ and }D=0\right)\text{ or }C=0\end{matrix}\right,
A uchun yechish
\left\{\begin{matrix}A=\frac{CD^{2}}{B\left(D-1\right)}\text{, }&D\neq 1\text{ and }B\neq 0\\A\in \mathrm{R}\text{, }&\left(B=0\text{ and }D=0\right)\text{ or }C=0\end{matrix}\right,
B uchun yechish
\left\{\begin{matrix}B=\frac{CD^{2}}{A\left(D-1\right)}\text{, }&D\neq 1\text{ and }A\neq 0\\B\in \mathrm{R}\text{, }&\left(A=0\text{ and }D=0\right)\text{ or }C=0\end{matrix}\right,
Baham ko'rish
Klipbordga nusxa olish
ABCD-ABC=D^{2}CC
D^{2} hosil qilish uchun D va D ni ko'paytirish.
ABCD-ABC=D^{2}C^{2}
C^{2} hosil qilish uchun C va C ni ko'paytirish.
ABCD-ABC=C^{2}D^{2}
Shartlarni qayta saralash.
\left(BCD-BC\right)A=C^{2}D^{2}
A'ga ega bo'lgan barcha shartlarni birlashtirish.
\frac{\left(BCD-BC\right)A}{BCD-BC}=\frac{C^{2}D^{2}}{BCD-BC}
Ikki tarafini BCD-BC ga bo‘ling.
A=\frac{C^{2}D^{2}}{BCD-BC}
BCD-BC ga bo'lish BCD-BC ga ko'paytirishni bekor qiladi.
A=\frac{CD^{2}}{B\left(D-1\right)}
C^{2}D^{2} ni BCD-BC ga bo'lish.
ABCD-ABC=D^{2}CC
D^{2} hosil qilish uchun D va D ni ko'paytirish.
ABCD-ABC=D^{2}C^{2}
C^{2} hosil qilish uchun C va C ni ko'paytirish.
ABCD-ABC=C^{2}D^{2}
Shartlarni qayta saralash.
\left(ACD-AC\right)B=C^{2}D^{2}
B'ga ega bo'lgan barcha shartlarni birlashtirish.
\frac{\left(ACD-AC\right)B}{ACD-AC}=\frac{C^{2}D^{2}}{ACD-AC}
Ikki tarafini ACD-AC ga bo‘ling.
B=\frac{C^{2}D^{2}}{ACD-AC}
ACD-AC ga bo'lish ACD-AC ga ko'paytirishni bekor qiladi.
B=\frac{CD^{2}}{A\left(D-1\right)}
C^{2}D^{2} ni ACD-AC ga bo'lish.
ABCD-ABC=D^{2}CC
D^{2} hosil qilish uchun D va D ni ko'paytirish.
ABCD-ABC=D^{2}C^{2}
C^{2} hosil qilish uchun C va C ni ko'paytirish.
ABCD-ABC=C^{2}D^{2}
Shartlarni qayta saralash.
\left(BCD-BC\right)A=C^{2}D^{2}
A'ga ega bo'lgan barcha shartlarni birlashtirish.
\frac{\left(BCD-BC\right)A}{BCD-BC}=\frac{C^{2}D^{2}}{BCD-BC}
Ikki tarafini BCD-BC ga bo‘ling.
A=\frac{C^{2}D^{2}}{BCD-BC}
BCD-BC ga bo'lish BCD-BC ga ko'paytirishni bekor qiladi.
A=\frac{CD^{2}}{B\left(D-1\right)}
C^{2}D^{2} ni BCD-BC ga bo'lish.
ABCD-ABC=D^{2}CC
D^{2} hosil qilish uchun D va D ni ko'paytirish.
ABCD-ABC=D^{2}C^{2}
C^{2} hosil qilish uchun C va C ni ko'paytirish.
ABCD-ABC=C^{2}D^{2}
Shartlarni qayta saralash.
\left(ACD-AC\right)B=C^{2}D^{2}
B'ga ega bo'lgan barcha shartlarni birlashtirish.
\frac{\left(ACD-AC\right)B}{ACD-AC}=\frac{C^{2}D^{2}}{ACD-AC}
Ikki tarafini ACD-AC ga bo‘ling.
B=\frac{C^{2}D^{2}}{ACD-AC}
ACD-AC ga bo'lish ACD-AC ga ko'paytirishni bekor qiladi.
B=\frac{CD^{2}}{A\left(D-1\right)}
C^{2}D^{2} ni ACD-AC ga bo'lish.
Misollar
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Chegaralar
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