How do you find the interval notation to prove f(x)= x/(sqrt(1-x^2))f(x)=x√1−x2 is continuous?
1 Answer
Explanation:
First, identify the domain of the function.
Since you're dealing with the square root of an expression, you need that expression to be positive for any value of
Moreover, you need that expression to be positive and different from zero, since taking the square root of zero would produce a division by zero.
So, you need
1 - x^2 > 01−x2>0
x^2 < 1x2<1
sqrt(x^2) < sqrt(1) implies |x| < 1√x2<√1⇒|x|<1
This means that you have
x < 1" "x<1 and" "-x < 1 implies x > -1 −x<1⇒x>−1
The domain of the function will be
That means that you need
color(blue)(lim_(x -> c) f(x) = f(c)," "(AA) c in (-1,1))
So, for any
f(c) = c/sqrt(1-c^2)
Now focus on the numerator and denominator if this fraction. You can write
c = lim_(x ->c) x" " and" "sqrt(1-c^2) = sqrt(1 - lim_(x ->c)x^2)
Since those limits exist for
f(c) = c/sqrt(1-c^2) = (lim_(x ->c)x)/sqrt(1 - lim_(x->c)x^2)
You know that the limit of a constant is equal to that constant, so you can write
(lim_(x->c)x)/sqrt(lim_(x->c)1 - lim_(x->c)x^2) = (lim_(x->c)x)/sqrt(lim_(x->c)(1-x^2))
The denominatoris equivalent to
sqrt(lim_(x->c)(1-x^2)) = lim_(x->c)sqrt(1-x^2)
which means that you get, using the fact that the quotient of the limits is equal to the limit of the quotient
(lim_(x->c)x)/(lim_(x->c)sqrt(1-x^2)) = lim_(x->c)(x/sqrt(1-x^2)) = lim_(x->c)f(x)
Since
