Question3. Determine whether the sets defined by the following vectors are subspaces of . (a)
Studdy Solution
STEP 1
1. We are given a vector in the form .
2. We need to determine if the set of all such vectors forms a subspace of .
3. A subspace must satisfy three conditions: it must contain the zero vector, be closed under vector addition, and be closed under scalar multiplication.
STEP 2
1. Check if the zero vector is in the set.
2. Check if the set is closed under vector addition.
3. Check if the set is closed under scalar multiplication.
STEP 3
Check if the zero vector is in the set.
Substitute and into the vector :
Since the zero vector is in the set, this condition is satisfied.
STEP 4
Check if the set is closed under vector addition.
Take two arbitrary vectors and from the set.
Add them:
The result is in the same form as the original vector, so the set is closed under addition.
STEP 5
Check if the set is closed under scalar multiplication.
Take an arbitrary vector and a scalar .
Multiply the vector by the scalar:
The result is in the same form as the original vector, so the set is closed under scalar multiplication.
Since the set satisfies all three conditions, it is a subspace of .
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