The largest set of real values of x for ...

The largest set of real values of x for which `f(x) = sqrt((x+2)(5-x)) - (1)/(sqrt(x^(2) -4))` is a real function is

A

`[1,2) cup (2,5]`

B

(2, 5]

C

[3, 4]

D

`[(1)/(sqrt(2)), 1]`

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The correct Answer is:

B

`f(x) = sqrt((x+2)(5-x)) -(1)/(sqrt(x^(2)-4))`
For f(x) to be real, we have
`(x+2) (5-x) ge 0 and x^(2) -4 gt 0`
i.e. `(x+2) (x-5) le 0 and (x+2)(x-2) gt 0`
Required domain (2, 5)

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