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प्रश्न
Find the roots of the following quadratic equations (if they exist) by the method of completing the square.
`x^2-(sqrt2+1)x+sqrt2=0`
उत्तर
We have been given that,
`x^2-(sqrt2+1)x+sqrt2=0`
Now take the constant term to the RHS and we get
`x^2-(sqrt2+1)x=-sqrt2`
Now add square of half of co-efficient of ‘x’ on both the sides. We have,
`x^2-(sqrt2+1)x+((sqrt2+1)/2)^2=((sqrt2+1)/2)^2-sqrt2`
`x^2+((sqrt2+1)/2)^2-2((sqrt2+1)/2)x=(3-2sqrt2)/4`
`(x-(sqrt2+1)/2)^2=(sqrt2-1)^2/2^2`
Since RHS is a positive number, therefore the roots of the equation exist.
So, now take the square root on both the sides and we get
`x-(sqrt2+1)/2=+-((sqrt2-1)/2)`
`x=(sqrt2+1)/2+-(sqrt2-1)/2`
Now, we have the values of ‘x’ as
`x=(sqrt2+1)/2+(sqrt2-1)/2=sqrt2`
Also we have,
`x=(sqrt2+1)/2-(sqrt2-1)/2=1`
Therefore the roots of the equation are `sqrt2`and 1.
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