The discussion revolves around determining the intervals where the function f(x) = x/(x^2 - 1) is increasing or decreasing. Participants are analyzing the derivative and its implications for the function's behavior, particularly in relation to asymptotes.
Some participants have confirmed the derivative and its behavior, while others are exploring how to determine intervals of increase or decrease based on the sign of the derivative across the identified intervals. There is acknowledgment of the function's decreasing nature across the intervals, but no consensus on the final presentation of the intervals has been reached.
Participants note that the function is undefined at x = ±1, which influences the intervals being considered. The discussion includes graphed results that suggest the function is decreasing throughout the intervals identified.
It looks like there's a term missing here. What is the correct formula for the function?agv567 said:Homework Statement
function is (X) / (X^2 - )
Since I don't know what you started with, there's no way to tell if this is right.agv567 said:The derivative(as far as I know) is (-X^2-1) / (X^2-1)^2
agv567 said:The Attempt at a Solution
So I set it equal to zero, and I get -X^2 -1 = 0, which means X^2 = -1
This does not exist, so what would I say for the intervals? When I graph it, the function is decreasing on all, but there are asymptotes for X = +-1.
I assume that you mean:agv567 said:Homework Statement
function is (X) / (X^2 - )
The derivative(as far as I know) is (-X^2-1) / (X^2-1)^2
The Attempt at a Solution
So I set it equal to zero, and I get -X^2 -1 = 0, which means X^2 = -1
This does not exist, so what would I say for the intervals? When I graph it, the function is decreasing on all, but there are asymptotes for X = +-1.
agv567 said:Well by graphing it, all of them are negative.
How would I know that you would get 2 valus for X algebraically when the derivative is never equal to zero?