Question

if x is equals to 2 + square root 3 then find the value of x + X upon 1​

Answer 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)]/[(22)−(3)2]

=[(2+3)]/[4−3]

=2+3

Now,

x−1/x=2−3−2−3

=−23

Let us cube on both sides, we get

(x−1/x)3=(−23)3

x3−1/x3−3(x)(1/x)(x−1/x)=243

x3−1/x3

Hence,

x3−1/x3=−303

Answer 2

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