Question

How do you find the intervals of increasing and decreasing using the first derivative given `y=1/(x+1)^2`?

Answer 1

`y` is increasing for `(-oo, -1)` and decreasing for `(-1, +oo)`

Explanation:

`y = 1/(x+1)^2`

`= (x+1)^-2`

Applying the Power Rule and Chain Rule

`y' = -2(x+1)^-3 * 1`

`y'` represents the slope of `y` at an point `x` in its domain

Hence: `y` will be increasing when `y' >0`
and decreasing when `y'<0`

`:. y` will be increasing for `-2(x+1)^-3 >0`
`-> (x+1)<0` i.e. `x< -1`

and `y` will be decreasing for `-2(x+1)^-3 <0`
`-> (x+1)>0` i.e. `x> -1`

Hence: `y` is increasing for `(-oo, -1)` and decreasing for `(-1, +oo)`

This can be seen from the graph of `y` below:

graph{1/(x+1)^2 [-3.847, 1.626, -0.537, 2.202]}