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If x=
[tex] \sq 3 \sqrt{2 + \sqrt{3} } [/tex]
,then x³+1/x³ is​

By Peyton

If x=
[tex] \sq 3 \sqrt{2 + \sqrt{3} } [/tex]
,then x³+1/x³ is​

About the author
Peyton

Who believed that a country can’t become free until every citizen of the country

enjoy equal rights ?​


Prove that
logx=log2-(x-2)/2-(x-2)^2/8+(x-2)^3/24….​

1 thought on “If x= <br />[tex] \sq 3 \sqrt{2 + \sqrt{3} } [/tex]<br /> ,then x³+1/x³ is​”

  1. Step-by-step explanation:

    It is given that,

    x=2−

    3

    so,

    1/x=1/(2−

    3

    )

    By rationalizing the denominator, we get

    =[1(2+

    3

    )]/[(2−

    3

    )(2+

    3

    )]

    =[(2+

    3

    )]/[(2

    2

    )−(

    3

    )

    2

    ]

    =[(2+

    3

    )]/[4−3]

    =2+

    3

    Now,

    x−1/x=2−

    3

    −2−

    3

    =−2

    3

    Let us cube on both sides, we get

    (x−1/x)

    3

    =(−2

    3

    )

    3

    x

    3

    −1/x

    3

    −3(x)(1/x)(x−1/x)=24

    3

    x

    3

    −1/x

    3

    −3(−2/

    3

    )=−24

    3

    x

    3

    −1/x

    3

    +6

    3

    =−24

    3

    x

    3

    −1/x

    3

    +6

    3

    =−24

    3

    x

    3

    −1/x

    3

    =−24

    3

    −6

    3

    =−30

    3

    Hence,

    x

    3

    −1/x

    3

    =−30

    3

    Reply

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