QuestionConsider the following vectors:
For each of the following vectors, determine whether it is in . If so, express it as a linear combination using , and as the names of the vectors above.
< Select an answer >
Select an answer >
< Select an answer >
Studdy Solution
STEP 1
1. The vectors , , and are given in .
2. A vector is in if there exist scalars such that .
3. We will solve a system of linear equations to determine if each vector is in the span.
STEP 2
1. Set up the system of equations for each vector , , and .
2. Solve the system of equations to check for consistency.
3. Determine if the vector is in the span and, if so, express it as a linear combination.
STEP 3
Set up the system of equations for :
Given:
We need to solve:
This translates to the following system of equations:
\begin{align*}
1x + 1y + 2z &= 2 \\
2x + 4y - 2z &= -4 \\
-3x - 1y - 10z &= -12 \\
-1x - 2y - 1z &= 0
\end{align*}
STEP 4
Solve the system of equations for :
Using methods such as substitution or elimination, solve the above system. After solving, we find:
STEP 5
Determine if is in the span and express it as a linear combination:
Since a solution exists, is in .
Express as:
STEP 6
Set up the system of equations for :
Given:
We need to solve:
This translates to the following system of equations:
\begin{align*}
1x + 1y + 2z &= -2 \\
2x + 4y - 2z &= -8 \\
-3x - 1y - 10z &= 2 \\
-1x - 2y - 1z &= 4
\end{align*}
STEP 7
Solve the system of equations for :
After solving, we find that the system is inconsistent, meaning there is no solution.
STEP 8
Determine if is in the span:
Since there is no solution, is not in .
STEP 9
Set up the system of equations for :
Given:
We need to solve:
This translates to the following system of equations:
\begin{align*}
1x + 1y + 2z &= -10 \\
2x + 4y - 2z &= 2 \\
-3x - 1y - 10z &= 6 \\
-1x - 2y - 1z &= -6
\end{align*}
STEP 10
Solve the system of equations for :
After solving, we find:
STEP 11
Determine if is in the span and express it as a linear combination:
Since a solution exists, is in .
Express as:
The results are:
- is in the span and can be expressed as .
- is not in the span.
- is in the span and can be expressed as .
Was this helpful?