Do the following two sets of vectors span the same sub- space of R3? (Justify your...

Exercise 6. Consider the following vectors in R3 . v1 = (1, −1, 0) v2 =...

Exercise 6. Consider the following vectors in R3 . v1 = (1, −1, 0) v2 = (3, 2, −1) v3 = (3, 5, −2 )   (a) Verify that the general vector u = (x, y, z) can be written as a linear combination of v1, v2, and v3. (Hint : The coefficients will be expressed as functions of the entries x, y and z of u.) Note : This shows that Span{v1, v2, v3} = R3 . (b) Can R3 be...

Explain why the set of vectors given in matrix form do not span R3 : a1...

Explain why the set of vectors given in matrix form do not span R3 : a1 b1 2a1 -3b1 a2 b2 2a2 -3b2 a3 b3 2a3 -3b3

Find a linearly independent set of vectors that spans the same subspace of R3 as that...

Find a linearly independent set of vectors that spans the same subspace of R3 as that spanned by the vectors [-3,1,3] , [-6,5,5],[0,-3,1] Linearly independent set: [x,y,z] , [x,y,z]

find the basis and dimension for the span of each of the following sets of vectors....

find the basis and dimension for the span of each of the following sets of vectors. a={[2,-1,1],[0,0,0],[-4,2,-2],[6,-3,3]} basis= dimension= b={[3,3,3],[9,9,10],[21,21,23],[-33,-33,-36]} basis= dimension=

Using MATLAB solve: The vectors v1=(1,-1,1), v2=(0,1,2), v3=(3,0,1) span R3. Express w=(x,y,z) as linear combination of...

Using MATLAB solve: The vectors v1=(1,-1,1), v2=(0,1,2), v3=(3,0,1) span R3. Express w=(x,y,z) as linear combination of v1,v2,v3.

Question 1:  Is there a vector space that can not be an inner product space? Justify your...

Question 1:  Is there a vector space that can not be an inner product space? Justify your answer. Part 2: Suppose that u and v are two non-orthogonal vectors in an inner product space V,< , >. Question 2: Can we modify the inner product < , > to a new inner product so that the two vectors become orthogonal? Justify your answer.

Suppose that u and v are two non-orthogonal vectors in an inner product space V,< ,...

Suppose that u and v are two non-orthogonal vectors in an inner product space V,< , >. Question 2: Can we modify the inner product < , > to a new inner product so that the two vectors become orthogonal? Justify your answer.

please choose your favorite, unique plane in R3 that passes though the origin (0,0,0). (An example...

please choose your favorite, unique plane in R3 that passes though the origin (0,0,0). (An example plane is: x + 5y – z = 0. You can use your Module Four Discussion Forum plane through the origin if desired.) What is the equation for your plane? (4 points) What is a basis for the subspace of R3 formed by your plane? Hint: (y and z are free variables.) (8 points) Identify three non-zero vectors on the plane. Do not choose...

True or False? Justify your answer. If the kernel of matrix A contains two different vectors,...

True or False? Justify your answer. If the kernel of matrix A contains two different vectors, then homogeneous system A.x=θ has infinitely many solutions.

Use vectors to find the interior angles of the triangle given the following sets of vertices....

Use vectors to find the interior angles of the triangle given the following sets of vertices. Round your answer, in degrees, to two decimal places. (−7,−4)(−7,−4), (−5,7)(−5,7), (3,2)