I have a logical statement that says "If everyone plays the game, we will have fun".

In formal logic we can write this as:

Let D mean the people playing. Let G be the predicate for play the game. Let F be the predicate for having fun.

Thus [VxeD, G(x)] -> [VyeD, F(y)]

V is the computer science symbol for universal quantification. E below is the existential quantifier.

I'm looking for a way to write a similar statement using only existential quantifiers. My best guess would be that we simply need to find a way to find the counter-example where it doesn't happen, thus negate the above.

The problem is negating it doesn't make sense. We get:

[VxeD, G(x)] ^ [EyeD, !L(y)]

It's not a proper statement since the universal is still in there though it is also equivalent. Thus I need to re-fabricate my statement to something like: VxeD, VyeD, G(x) ^ F(y) I would get ExeD, EyeD, !G(x) v !F(y) which would mean "There exists someone who doesn't learn or someone else who doesn't have fun" which doesn't seem correct to me.

Some guidance or clarification would be fantastic :-)

Thanks!