Find all possible values of (i) sqrt(|x|-2) (ii) sqrt(3-|x-1|) (iii) Sqrt(4-sqrt^2))

Find all possible values of (i) sqrt(|x|-2) (ii) sqrt(3-|x-1|) (iii)

1.	Find all possible values of (i) sqrt(\|x\|-2) (ii) sqrt(3-\|x-1\|) (iii) Sqrt(4-sqrt^2))
Answer» Solution :`sqrt(\|x\|-2)` we know that SQUARE roots are defined for non- negative values only . It implies that we must have `\|x\|-2 LE 0` Thus `sqrt(\|x\|-2) ge 0 ` (ii) `sqrt(3-\|x-1\|)` is defined when `3-\|x-1\| le 0 ` But the maximum value of 3-\|x-1\| is 3 , when \|x-1\| is 0 HENCE for `sqrt(3-\|x-1\|)` to get defined , `0 le 3- \|x-1\| le 3 ` Thus , `sqrt(3-\|x-1\|)in [0,sqrt(3)]` Alternatively , `\|x-1\| ge 0` `rArr-\|x-1\| le 0 ` `rArr3-\|x-1\|le3` But for `sqrt(3-\|x-1\|)` to get defined ,we must have `0 le 3 -\|x-1\| le 3 ` `rArr0 le sqrt(3-\|x-1\| le sqrt(3)` (iii) `sqrt(4-sqrt(x^2))=sqrt(4-\|x\|)` `\|x\| ge 0 ` `rArr- \|x\| le 0 ` `rArr4-\|x\| le 4 ` But for `sqrt(4-\|x\| )` to get defined `0 le 4 - \|x\| le 4 ` `therefore0 le sqrt(4-\|x\|) le 2 `

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Find all possible values of (i) sqrt(|x|-2) (ii) sqrt(3-|x-1|) (iii) Sqrt(4-sqrt^2))

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