Is [math]0 \geq x > 2[/math] the negation of [math]0 < x \leq 2[/math]?
>>8449088
no.
[math] 0 \geq x [/math] or [math] x> 2 [/math]
>>8449100
That's not negation, that's the complement.
I'd say the answer is [math]-2 \leq x < 0[/math]. That is, the negation of [math]x \in (a, b][/math] is [math]x \in [-b, -a)[/math]. This is nice, because if [math]x[/math] can only have one value, then the negation is [math]-x[/math] like it should be.
>>8449110
>literal autism the post
>>8449110
bait