In Exercises 3-6, with T defined by T ( x ) = A x , find a vector x whose image under T is b , and determine whether x is unique. 3. A = [ 1 0 − 2 − 2 1 6 3 − 2 − 5 ] , b = [ − 1 7 − 3 ]
In Exercises 3-6, with T defined by T ( x ) = A x , find a vector x whose image under T is b , and determine whether x is unique. 3. A = [ 1 0 − 2 − 2 1 6 3 − 2 − 5 ] , b = [ − 1 7 − 3 ]
Quantities that have magnitude and direction but not position. Some examples of vectors are velocity, displacement, acceleration, and force. They are sometimes called Euclidean or spatial vectors.
The following question is from linear algebra : Factors the vector (6, -5, -1)t into three components a,b,c that satisfy the following conditions: a depends on (2,0,1)t, b depends on (1,2, 0)t and c is orthogonal to a and b. Please show it step by step.
If T is defined by T(x) = Ax, find a vector x whose image under T is b, and determine whether x is unique. Let
%3D
1
- 3
3
- 4
A= 0
1
- 5
and b =
- 4
-10
9.
- 3
Find a single vector x whose image under T is b.
X =
The following question is from linear algebra first year: Factors the vector (6, -5, -1)t into three components a,b,c that satisfy the following conditions: a depends on (2,0,1)t, b depends on (1,2, 0)t and c is orthogonal to a and b. Please show it step by step. Can we get integers as answers?
Chapter 1 Solutions
Thomas' Calculus and Linear Algebra and Its Applications Package for the Georgia Institute of Technology, 1/e
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