Is the set of all invertible matrices a linear subspace of the set of all square matrices over reals?
Let's break this down:

A linear subspace means it is closed under addition, scalar multiplication, and contains the zero matrix.
The set of invertible matrices means matrices that have an inverse.
The set of all square matrices over reals just means n×n matrices with real entries.

So we need to check:

If A and B are invertible matrices, is A + B invertible? Yes, (A + B)^-1 = A^-1 + B^-1
If c is a real scalar and A is invertible, is cA invertible? Yes, (cA)^-1 = (1/c)A^-1
Is the 0 matrix invertible? No, 0 is not invertible.

Therefore, the set of invertible matrices is not a linear subspace of the set of all square matrices over reals. It fails the third condition of containing the zero matrix.