Consider the set of all ordered pairs of real numbers with standard vector addition but with...

Let V be the set of all ordered pairs of real numbers. Consider the following addition...

Let V be the set of all ordered pairs of real numbers. Consider the following addition and scalar multiplication operations V. Let u = (u1, u2) and v = (v1, v2). • u ⊕ v = (u1 + v1 + 1, u2 + v2 + ) • ku = (ku1 + k − 1, ku2 + k − 1) Show that V is not a vector space.

Let V be the set of all ordered pairs of real numbers. Consider the following addition...

Let V be the set of all ordered pairs of real numbers. Consider the following addition and scalar multiplication operations V. Let u = (u1, u2) and v = (v1, v2). • u ⊕ v = (u1 + v1 + 1, u2 + v2 + ) • ku = (ku1 + k − 1, ku2 + k − 1) 1)Show that the zero vector is 0 = (−1, −1). 2)Find the additive inverse −u for u = (u1, u2). Note:...

Are the following vector space and why? 1.The set V of all ordered pairs (x, y)...

Are the following vector space and why? 1.The set V of all ordered pairs (x, y) with the addition of R2, but scalar multiplication a(x, y) = (x, y) for all a in R. 2. The set V of all 2 × 2 matrices whose entries sum to 0; operations of M22.

Let V be the set of all triples (r,s,t) of real numbers with the standard vector...

Let V be the set of all triples (r,s,t) of real numbers with the standard vector addition, and with scalar multiplication in V defined by k(r,s,t) = (kr,ks,t). Show that V is not a vector space, by considering an axiom that involves scalar multiplication. If your argument involves showing that a certain axiom does not hold, support your argument by giving an example that involves specific numbers. Your answer must be well-written.

Determine whether the set with the definition of addition of vectors and scalar multiplication is a...

Determine whether the set with the definition of addition of vectors and scalar multiplication is a vector space. If it is, demonstrate algebraically that it satisfies the 8 vector axioms. If it's not, identify and show algebraically every axioms which is violated. Assume the usual addition and scalar multiplication if it's not defined. V = R, x + y = max( x , y ), cx=(c)(x) (usual multiplication.

Consider C as a vector space over R in the natural way. Here vector addition and...

Consider C as a vector space over R in the natural way. Here vector addition and scalar multiplication are the usual addition and multiplication of complex numbers. Show that {1 − i, 1 + i} is linearly independent. Consider C as a vector space over C in the natural way. Here vector addition is the usual addition of complex numbers and the scalar multiplication is the usual multiplication of a real number by a complex number. Show that {1 −...

Show that the set Vof all 3 x 3 matrices with distinct entries also combination of...

Show that the set Vof all 3 x 3 matrices with distinct entries also combination of positive and negative numbers is a vector space if vector addition is defined to be matrix addition and vector scalar multiplication is defined to be matrix scalar multiplication

Let X be the vector space of all ordered pairs of complex numbers. Can we obtain...

Let X be the vector space of all ordered pairs of complex numbers. Can we obtain the norm defined on ||x||=|ξ_1 |+|ξ_2 | where x=(ξ_1,ξ_2) from an inner product?

Let X be the vector space of all ordered pairs of complex numbers. Can we obtain...

Let X be the vector space of all ordered pairs of complex numbers. Can we obtain the norm defined on ||x||=|ξ_1 |+|ξ_2 | where x=(ξ_1,ξ_2) from an inner product?

Let S={(0,1),(1,1),(3,-2)} ⊂ R², where R² is a real vector space with the usual vector addition...

Let S={(0,1),(1,1),(3,-2)} ⊂ R², where R² is a real vector space with the usual vector addition and scalar multiplication. (i) Show that S is a spanning set for R²​​​​​​​ (ii)Determine whether or not S is a linearly independent set