Leysa x+z/x-z-x-z/x+z=z(2x^2+zy)/x^2-z^2 | Microsoft stærðfræði leysa

Leystu fyrir y (complex solution)

Leystu fyrir y

Leystu fyrir x (complex solution)

\left\{\begin{matrix}x=\frac{\sqrt{4-2yz}}{2}+1\text{, }&\left(z\neq -\frac{y}{2}+2\text{ and }z\neq -\frac{y}{2}-2\right)\text{ or }\left(z\neq -\frac{y}{2}+2\text{ and }y\neq -2\text{ and }arg(-\frac{y}{2}-1)<\pi \right)\text{ or }\left(arg(2-y)\geq \pi \text{ and }y\neq 2\text{ and }z\neq -\frac{y}{2}-2\right)\text{ or }\left(arg(2-y)\geq \pi \text{ and }y\neq 2\text{ and }arg(-\frac{y}{2}-1)<\pi \right)\\x=-\frac{\sqrt{4-2yz}}{2}+1\text{, }&\left(z\neq 0\text{ and }z\neq -\frac{y}{2}+2\text{ and }arg(-\frac{y}{2}-1)\geq \pi \text{ and }z\neq -1\right)\text{ or }\left(z\neq 0\text{ and }z\neq -\frac{y}{2}+2\text{ and }arg(-\frac{y}{2}-1)\geq \pi \text{ and }y\neq -2\right)\text{ or }\left(z\neq 0\text{ and }z\neq -\frac{y}{2}+2\text{ and }z\neq -\frac{y}{2}-2\text{ and }z\neq -1\right)\text{ or }\left(z\neq 0\text{ and }z\neq -\frac{y}{2}+2\text{ and }z\neq -\frac{y}{2}-2\text{ and }y\neq -2\right)\text{ or }\left(z\neq 0\text{ and }z\neq 1\text{ and }arg(y-2)\geq \pi \text{ and }arg(-\frac{y}{2}-1)\geq \pi \text{ and }z\neq -1\right)\text{ or }\left(z\neq 0\text{ and }z\neq 1\text{ and }arg(y-2)\geq \pi \text{ and }arg(-\frac{y}{2}-1)\geq \pi \text{ and }y\neq -2\right)\text{ or }\left(z\neq 0\text{ and }z\neq 1\text{ and }arg(y-2)\geq \pi \text{ and }z\neq -\frac{y}{2}-2\text{ and }z\neq -1\right)\text{ or }\left(z\neq 0\text{ and }z\neq 1\text{ and }arg(y-2)\geq \pi \text{ and }z\neq -\frac{y}{2}-2\text{ and }y\neq -2\right)\text{ or }\left(z\neq 0\text{ and }y\neq 2\text{ and }arg(y-2)\geq \pi \text{ and }arg(-\frac{y}{2}-1)\geq \pi \text{ and }z\neq -1\right)\text{ or }\left(z\neq 0\text{ and }y\neq 2\text{ and }arg(y-2)\geq \pi \text{ and }arg(-\frac{y}{2}-1)\geq \pi \text{ and }y\neq -2\right)\text{ or }\left(z\neq 0\text{ and }y\neq 2\text{ and }arg(y-2)\geq \pi \text{ and }z\neq -\frac{y}{2}-2\text{ and }z\neq -1\right)\text{ or }\left(z\neq 0\text{ and }y\neq 2\text{ and }arg(y-2)\geq \pi \text{ and }z\neq -\frac{y}{2}-2\text{ and }y\neq -2\right)\\x\neq 0\text{, }&z=0\end{matrix}\right.

Spurningakeppni

Algebra

5 vandamál svipuð og:

Svipuð vandamál úr vefleit

https://www.tiger-algebra.com/drill/((xy_xz)/(xz-z~2))((xy-yz)/(xz_yz))/((y~2_yz)/(x~2_xy))/

https://socratic.org/questions/how-do-you-combine-2x-y-x-y-3x-y-x-y-5x-2y-y-2-x-2

https://www.tiger-algebra.com/drill/(6x_5y)/(6x~2_5xy-4y~2)_(x_2y)/(9x~2-16y~2)/

https://www.tiger-algebra.com/drill/x~2-6x_xy-6y/9x~2-9y~2$3x-3y/x-6/

Deila

Afritað á klemmuspjald

\left(-x-z\right)\left(x+z\right)-\left(-x+z\right)\left(x-z\right)=-z\left(2x^{2}+zy\right)

Margfaldaðu báðar hliðar jöfnunnar með \left(x-z\right)\left(-x-z\right), minnsta sameiginlega margfeldi x-z,x+z,x^{2}-z^{2}.

-x^{2}-2xz-z^{2}-\left(-x+z\right)\left(x-z\right)=-z\left(2x^{2}+zy\right)

Notaðu dreifieiginleika til að margfalda -x-z með x+z og sameina svipuð hugtök.

-x^{2}-2xz-z^{2}-\left(-x^{2}+2xz-z^{2}\right)=-z\left(2x^{2}+zy\right)

Notaðu dreifieiginleika til að margfalda -x+z með x-z og sameina svipuð hugtök.

-x^{2}-2xz-z^{2}+x^{2}-2xz+z^{2}=-z\left(2x^{2}+zy\right)

Til að finna andstæðu -x^{2}+2xz-z^{2} skaltu finna andstæðu hvers liðs.

-2xz-z^{2}-2xz+z^{2}=-z\left(2x^{2}+zy\right)

Sameinaðu -x^{2} og x^{2} til að fá 0.

-4xz-z^{2}+z^{2}=-z\left(2x^{2}+zy\right)

Sameinaðu -2xz og -2xz til að fá -4xz.

-4xz=-z\left(2x^{2}+zy\right)

Sameinaðu -z^{2} og z^{2} til að fá 0.

-4xz=-2zx^{2}-yz^{2}

Notaðu dreifieiginleika til að margfalda -z með 2x^{2}+zy.

-2zx^{2}-yz^{2}=-4xz

Skipta um hliðar svo allir liðir breytunnar séu vinstra megin.

-yz^{2}=-4xz+2zx^{2}

Bættu 2zx^{2} við báðar hliðar.

\left(-z^{2}\right)y=2zx^{2}-4xz

Jafnan er í staðalformi.

\frac{\left(-z^{2}\right)y}{-z^{2}}=\frac{2xz\left(x-2\right)}{-z^{2}}

Deildu báðum hliðum með -z^{2}.

y=\frac{2xz\left(x-2\right)}{-z^{2}}

Að deila með -z^{2} afturkallar margföldun með -z^{2}.

y=-\frac{2x\left(x-2\right)}{z}

Deildu 2xz\left(-2+x\right) með -z^{2}.