Question

How do you solve `-x^2+x>=0`?

Answer 1

`(0,1)`
or
`0 < x < 1`

Explanation:

Factor `-x^2 +x >0`

`-x(x-1)>0`

Since this is greater than 0, then the two cases are +,+ and -,-.

Case 1 +,+:

`x-1>0` becomes `x>1`
`-x>0` becomes `x<0` the signs are flipped because we multiplied/divided by a negative.

Draw them on a number line and see where they share their domains. This one doesn't have any domain in common so the inequality doesn't work.

Case 2 -,-:

`x-1<0` becomes `x<1`
`-x<0` becomes `x>0`

If you draw this one on a number line, they share the domain at (0,1)
which is when 0 < x < 1.