How do you find the domain of $f(x) = (sqrt[x - 5](x - 6))/(x^2 - 7x + 6)$ ?

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How do you find the domain of $f(x) = (sqrt[x - 5](x - 6))/(x^2 - 7x + 6)$ ?

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Answer 1 · 2015-04-20T21:11:45

The answer is : $D = (5;6) uu (6;oo)$

The domain of a function is this subset of real numbers for which all the operations in the functions have sense.

In this case
1) the expression $x-5$ must be greater than or equal to zero (the square roots of negative numbers are not real)
2) the expression in denominator $x^2-7x+6$ cannot be zero (You cannot divide by zero).

From first condition you get an inequality $x-5 >=0$ which has a solution $x in (5; +oo)$

Second condition leads to solving a square equation $x^2-7x+6!=0$
For this equation $Delta = 7^2 - 4*1*6 = 25$
$sqrt(Delta) = 5$
$x_1=2; x_2=6$

So the answer is $D = (5;6) uu (6;oo)$

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How do you find the domain of $f(x) = (sqrt[x - 5](x - 6))/(x^2 - 7x + 6)$ ?

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