Advertisements
Advertisements
प्रश्न
if `x= 3 + sqrt8`, find the value of `x^2 + 1/x^2`
Advertisements
उत्तर
We know that `x^2 + 1/x^2 = (x +1/x)^2 - 2`. We have to find the value of `x^2 + 1/x^2`. As `x = 3 + sqrt8`
therefore
`1/x = 1/(3 + sqrt8)`
We know that rationalization factor for `3 + sqrt8` is `3 - sqrt8`. We will multiply numerator and denominator of the given expression `1/(3 = sqrt8)` by `3 - sqrt3` to get
`1/x = 1/(3 + sqrt8) xx (3 - sqrt8)/(3 -sqrt8)`
`= (3 - sqrt8)/(9 - 8)`
`= 3 - sqrt8`
Putting the vlaue of x and 1/x, we get
`x^2 + 1/x^2 = (3 + sqrt8 + 3 - sqrt8)^2 - 2`
`= (6)^2 - 2`
= 36 - 2
= 34
Hence the given expression is simplified to 34.
APPEARS IN
संबंधित प्रश्न
Find the value to three places of decimals of the following. It is given that
`sqrt2 = 1.414`, `sqrt3 = 1.732`, `sqrt5 = 2.236` and `sqrt10 = 3.162`
`3/sqrt10`
Rationales the denominator and simplify:
`(2sqrt6 - sqrt5)/(3sqrt5 - 2sqrt6)`
In the following determine rational numbers a and b:
`(4 + sqrt2)/(2 + sqrt2) = n - sqrtb`
Find the value of `6/(sqrt5 - sqrt3)` it being given that `sqrt3 = 1.732` and `sqrt5 = 2.236`
Simplify: \[\frac{7 + 3\sqrt{5}}{3 + \sqrt{5}} - \frac{7 - 3\sqrt{5}}{3 - \sqrt{5}}\]
`root(4)root(3)(2^2)` equals to ______.
Simplify the following:
`4sqrt(28) ÷ 3sqrt(7) ÷ root(3)(7)`
Simplify the following:
`root(4)(81) - 8root(3)(216) + 15root(5)(32) + sqrt(225)`
Rationalise the denominator in the following and hence evaluate by taking `sqrt(2) = 1.414, sqrt(3) = 1.732` and `sqrt(5) = 2.236`, upto three places of decimal.
`sqrt(2)/(2 + sqrt(2)`
If `a = (3 + sqrt(5))/2`, then find the value of `a^2 + 1/a^2`.
