How do you find the important parts of the equation to graph the function $y = -2/x$ ?

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Answer 1 · 2018-05-26T09:58:49

Domain, Range, Monotonocity.

Domain:
In in the equation $y=-2/x$ , $x!=0$
So, Domain will be $x in RR-{0}$
Range:
Given equation will give all the values except $0$
So, Range of the function will be $y in RR-{0}$
Monotonocity:
For checking increase and decrease of the function we have to derivatives of the function.
$dy/dx=2/x^2$
It is clear that $dy/dx>=0$ $AA x in RR$
There will be discontinuity at $x=0$ .
$(d^2y)/dy^2=-4/x^3$
So, by second derivative test,
The graph will be concave upward for $x<0$ and The graph will be concave downward for $x>0$ .

So, we will be able to draw tentative sketch of the graph. The graph will be-
graph{-2/x [-10, 10, -5, 5]}

How do you find the important parts of the equation to graph the function y = -2/xy = -2/x?