Math, asked by krishna7684, 1 year ago

the value of 1/2+root7 + 1/root7+root10 +......+1/root28+root31 is

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Answers

Answered by neosingh

find the attachment for answer

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neosingh: rest all get cancelled

krishna7684: how this equation come

neosingh: check the image bro and try writing it yourself

krishna7684: plzz tell me that you Wright 2 another equation but how it come

krishna7684: in starting

neosingh: 2 =√4

krishna7684: Thanx a lot bro you help me to a great extent

krishna7684: I hope you also help me in my another questions

neosingh: sure i will try

krishna7684: thnx

Answered by InesWalston

Answer-

$\frac{1}{2+\sqrt{7}} +\frac{1}{\sqrt{7}+\sqrt{10}}+......+\frac{1}{\sqrt{28}+\sqrt{31}}=\frac{\sqrt{31}-2}{3}$

Solution-

$=\frac{1}{2+\sqrt{7}} +\frac{1}{\sqrt{7}+\sqrt{10}}+......+\frac{1}{\sqrt{28}+\sqrt{31}}$

$=\frac{1}{\sqrt{4}+\sqrt{7}} +\frac{1}{\sqrt{7}+\sqrt{10}}+......+\frac{1}{\sqrt{28}+\sqrt{31}}$

The common difference here is 3, so multiplying conjugates in each terms,

$=\frac{(\sqrt{4}-\sqrt{7})}{(\sqrt{4}+\sqrt{7})(\sqrt{4}-\sqrt{7})} +\frac{(\sqrt{7}-\sqrt{10})}{(\sqrt{7}+\sqrt{10})(\sqrt{7}-\sqrt{10})}+......+\frac{(\sqrt{28}-\sqrt{31})}{(\sqrt{28}+\sqrt{31})(\sqrt{28}-\sqrt{31})}$

$=\frac{(\sqrt{4}-\sqrt{7})}{(\sqrt{4})^2-(\sqrt{7})^2} +\frac{(\sqrt{7}-\sqrt{10})}{(\sqrt{7})^2-(\sqrt{10})^2}+......+\frac{(\sqrt{28}-\sqrt{31})}{(\sqrt{28})^2-(\sqrt{31})^2}$

$=\frac{(\sqrt{4}-\sqrt{7})}{4-7} +\frac{(\sqrt{7}-\sqrt{10})}{7-10}+......+\frac{(\sqrt{28}-\sqrt{31})}{28-31}$

$=\frac{(\sqrt{4}-\sqrt{7})}{-3} +\frac{(\sqrt{7}-\sqrt{10})}{-3}+......+\frac{(\sqrt{28}-\sqrt{31})}{-3}$

$=\frac{(\sqrt{7}-\sqrt{4})}{3} +\frac{(\sqrt{10}-\sqrt{7})}{3}+......+\frac{(\sqrt{31}-\sqrt{28})}{3}$

$= \frac{1}{3}[\sqrt{7}-\sqrt{4}}+\sqrt{10}-\sqrt{7}+......+\sqrt{31}-\sqrt{28}]$

√4 from the first fraction and √31 from the last fraction will remain as it is, and all the other terms will cancelled out each other. So it becomes

$= \frac{1}{3}[\sqrt{31}-\sqrt{4}]$

$= \frac{\sqrt{31}-\sqrt{4}}{3}$

$= \frac{\sqrt{31}-2}{3}$

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