A solution set makes a mathematical sentence TRUE.
To me, I believe that a power set is not empty. Here is my thought: ∅ ∊ P(A) where P(A) is the power set and A is the set. This implies: ∅ ⊆ A This means that A = ∅, but ∅ ∉ A. ∅ ∊ A if A = {∅} [It makes sense that ∅ ∊ {∅}]. Then, {∅} ⊆ A, so {∅} ∊ P(A) = {∅, {∅}}. That P(A) is not empty since it contains {∅} and ∅.
Any ordered pair that makes the set true
The concept of successor in the definition of the set of integers.
No, it is part of the solution set.
Fire
stay
Ablaze is an adjective, as in 'They set the logs ablaze.'
fire
- Set This - World Ablaze was created on 2005-07-25.
When something albaze it makes this
They set themselves ablaze (set themselves on fire)
Ablaze means on fire.
Foundation or underpinnings.
From all the Cartoons I've watched I'm guessing lightning hit something set ablaze to it and humans wielded it. ya
The forest was ablaze again this weekend.
I hope the house is not ablaze.