Question

Given the piecewise function `1-x,x<-1`, `(x^2)-x,-1<=x<=6`, `x-7,x>6`, is it continuous at x=-1 and -6?

Answer 1

It is continuous at `x=-1` and `x=-6`, but not at `x=6`.

Explanation:

*As a disclaimer, I assumed the `-6` at the very end of the question was supposed to be a `6` and solved accordingly. *

To solve, you simply plug in the bordering `x`-value and see if the two are the same.

For `x=-1`:
`1-(-1)`
`1+1`
`2`

`(-1)^2-(-1)`
`1+1`
`2`

So, `f(x)` is continuous at `x=-1`

For `x=-6`, the function is continuous because it is not a border of the piecewise.

For `x=6`:
`(6)^2 - (6)`
`36-6`
`30`

`(6)-7`
`-1`
So, `f(x)` is not continuous at `x=6`