Let W be the set of all vectors of the form shown on the right, where a and b represent arbitrary real numbers. Find a s

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Let W Be The Set Of All Vectors Of The Form Shown On The Right Where A And B Represent Arbitrary Real Numbers Find A S 1 (208.27 KiB) Viewed 30 times

Let W be the set of all vectors of the form shown on the right, where a and b represent arbitrary real numbers. Find a set S of vectors that spans W, or give an example or an explanation showing why W is not a vector space. 4a + 7b -4 4a-3b Select the correct choice below and, if necessary, fill in the answer box to complete your choice. A. A spanning set is S= {}. (Use a comma to separate vectors as needed.) B. W is not a vector space because the zero vector and most sums and scalar multiples of vectors in W are not in W, because their second (middle) value is not equal to - 4. C. W is not a vector space because not all vectors u, v, and w in W have the property that u +v=v+u and (u + v) +w=u + (v + w). +