Negate the following statement: 'For all x∈Rx \in \mathbb{R}x∈R, x2≥0x^2 \geq 0x2≥0.'
For all x∈Rx \in \mathbb{R}x∈R, x2<0x^2 < 0x2<0
There exists x∈Rx \in \mathbb{R}x∈R such that x2<0x^2 < 0x2<0
There exists x∈Rx \in \mathbb{R}x∈R such that x2≥0x^2 \geq 0x2≥0
For some x∈Rx \in \mathbb{R}x∈R, x2=0x^2 = 0x2=0