सोडोवचें {l}{f{(x)}=-6x+3}{g{(x)}=3x+21x^-3}{h=f{(-3)}}{i=h}{j=i}{k=j}{l=k}{m=l}{n=m}{o=n}{p=o}{q=p}{text{Solvefor}rtext{where}}{r=q}

f, x, g, h, j, k, l, m, n, o, p, q, r खातीर सोडोवचें

सोडोवणी पांवडे

प्रस्नमाची

वॅब सोदांतल्यान समान समस्या

https://math.stackexchange.com/questions/3020316/knowing-the-distribution-of-x-y-implies-knowing-the-distribution-of-x-y-x

https://math.stackexchange.com/questions/2258739/differentiability-of-x2-logx4y2-at-0-0

https://math.stackexchange.com/questions/1844283/solve-the-closed-form-solution-for-argmax-of-xty-xt-lnx

वांटचें

क्लिपबोर्डाचेर नक्कल केलां

h=i

चवथें समिकरण विचारांत घेवचें. कुशी हाणच्यो ताका लागून बरोबर चिन्नाच्या दाव्यान सगळी विशम संज्ञा येतली.

i=f\left(-3\right)

तिसरें समिकरण विचारांत घेवचें. समिकरणात अचल संख्येची ज्ञात मानां रिगोवचीं.

\frac{i}{-3}=f

दोनुय कुशींक -3 न भाग लावचो.

-\frac{1}{3}i=f

-\frac{1}{3}i मेळोवंक i क -3 न भाग लावचो.

f=-\frac{1}{3}i

कुशी हाणच्यो ताका लागून बरोबर चिन्नाच्या दाव्यान सगळी विशम संज्ञा येतली.

-\frac{1}{3}ix=-6x+3

पयलें समिकरण विचारांत घेवचें. समिकरणात अचल संख्येची ज्ञात मानां रिगोवचीं.

-\frac{1}{3}ix+6x=3

दोनूय वटांनी 6x जोडचे.

\left(6-\frac{1}{3}i\right)x=3

\left(6-\frac{1}{3}i\right)x मेळोवंक -\frac{1}{3}ix आनी 6x एकठांय करचें.

x=\frac{3}{6-\frac{1}{3}i}

दोनुय कुशींक 6-\frac{1}{3}i न भाग लावचो.

x=\frac{3\left(6+\frac{1}{3}i\right)}{\left(6-\frac{1}{3}i\right)\left(6+\frac{1}{3}i\right)}

\frac{3}{6-\frac{1}{3}i} च्या अंश आनी भाजक दोनूय अंशाच्या जटील संयुक्त वरवीं गुणाकार करूंक जाय, 6+\frac{1}{3}i.

x=\frac{18+i}{\frac{325}{9}}

\frac{3\left(6+\frac{1}{3}i\right)}{\left(6-\frac{1}{3}i\right)\left(6+\frac{1}{3}i\right)} त गुणाकार करचे.

x=\frac{162}{325}+\frac{9}{325}i

\frac{162}{325}+\frac{9}{325}i मेळोवंक 18+i क \frac{325}{9} न भाग लावचो.

g\left(\frac{162}{325}+\frac{9}{325}i\right)=3\left(\frac{162}{325}+\frac{9}{325}i\right)+21\left(\frac{162}{325}+\frac{9}{325}i\right)^{-3}

दुसरें समिकरण विचारांत घेवचें. समिकरणात अचल संख्येची ज्ञात मानां रिगोवचीं.

g\left(\frac{162}{325}+\frac{9}{325}i\right)=\frac{486}{325}+\frac{27}{325}i+21\left(\frac{162}{325}+\frac{9}{325}i\right)^{-3}

\frac{486}{325}+\frac{27}{325}i मेळोवंक 3 आनी \frac{162}{325}+\frac{9}{325}i गुणचें.

g\left(\frac{162}{325}+\frac{9}{325}i\right)=\frac{486}{325}+\frac{27}{325}i+21\left(\frac{214}{27}-\frac{971}{729}i\right)

\frac{214}{27}-\frac{971}{729}i मेळोवंक -3 चो \frac{162}{325}+\frac{9}{325}i पॉवर मेजचो.

g\left(\frac{162}{325}+\frac{9}{325}i\right)=\frac{486}{325}+\frac{27}{325}i+\left(\frac{1498}{9}-\frac{6797}{243}i\right)

\frac{1498}{9}-\frac{6797}{243}i मेळोवंक 21 आनी \frac{214}{27}-\frac{971}{729}i गुणचें.

g\left(\frac{162}{325}+\frac{9}{325}i\right)=\frac{491224}{2925}-\frac{2202464}{78975}i

\frac{491224}{2925}-\frac{2202464}{78975}i मेळोवंक \frac{486}{325}+\frac{27}{325}i आनी \frac{1498}{9}-\frac{6797}{243}i ची बेरीज करची.

g=\frac{\frac{491224}{2925}-\frac{2202464}{78975}i}{\frac{162}{325}+\frac{9}{325}i}

दोनुय कुशींक \frac{162}{325}+\frac{9}{325}i न भाग लावचो.

g=\frac{\left(\frac{491224}{2925}-\frac{2202464}{78975}i\right)\left(\frac{162}{325}-\frac{9}{325}i\right)}{\left(\frac{162}{325}+\frac{9}{325}i\right)\left(\frac{162}{325}-\frac{9}{325}i\right)}

\frac{\frac{491224}{2925}-\frac{2202464}{78975}i}{\frac{162}{325}+\frac{9}{325}i} च्या अंश आनी भाजक दोनूय अंशाच्या जटील संयुक्त वरवीं गुणाकार करूंक जाय, \frac{162}{325}-\frac{9}{325}i.

g=\frac{\frac{55984}{675}-\frac{18088}{975}i}{\frac{81}{325}}

\frac{\left(\frac{491224}{2925}-\frac{2202464}{78975}i\right)\left(\frac{162}{325}-\frac{9}{325}i\right)}{\left(\frac{162}{325}+\frac{9}{325}i\right)\left(\frac{162}{325}-\frac{9}{325}i\right)} त गुणाकार करचे.

g=\frac{727792}{2187}-\frac{18088}{243}i

\frac{727792}{2187}-\frac{18088}{243}i मेळोवंक \frac{55984}{675}-\frac{18088}{975}i क \frac{81}{325} न भाग लावचो.

f=-\frac{1}{3}i x=\frac{162}{325}+\frac{9}{325}i g=\frac{727792}{2187}-\frac{18088}{243}i h=i j=i k=i l=i m=i n=i o=i p=i q=i r=i

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