Is u + v in U if u and v are elements of V but not in U?

zenn · Jun 9, 2008

Not sure how to prove the following:

If U is a subspace of a vector space V, and if u and v are elements of V, but one or both not in U, can u + v be in U?

Any help would be appreciated.

eastside00_99 · Jun 9, 2008

v=-u

so, if u is not in U, then v=-u is not in U. But, u+v=0 is in U. The other case is false --- i.e., if u+v is in U and u is in U, then v has to be in U also. You should prove that yourself though.

Is u + v in U if u and v are elements of V but not in U?

Thread 'About the existence of Hamel basis for vector spaces'

Similar threads

Hot Threads

I How to show ##p(x)=g(x)x\pm 1\in\Bbb{Q}[x]## is irreducible in ##\Bbb{Q}_{\Bbb{Z}}[x]##?

I Showing ##k[x_1,\ldots,x_n]/\mathfrak{a}## is finite dimensional

A Near-Rings with Noncommutative Addition and Two-Sided Distributivity

I How do we distinguish two different notations for cokernel and coimage?

I Localising a non integral domain at a prime

Recent Insights

Insights Why Entangled Photon-Polarization Qubits Violate Bell’s Inequality

Insights Quantum Entanglement is a Kinematic Fact, not a Dynamical Effect

Insights What Exactly is Dirac’s Delta Function? - Insight

Insights Relativator (Circular Slide-Rule): Simulated with Desmos - Insight

Insights Fixing Things Which Can Go Wrong With Complex Numbers

Insights Fermat's Last Theorem