Generalize the previous exercise to find the zero vector and additive inverse of the general element of M m × n ( ℝ ) . 16. Determine the zero vector in the vector space V = M 4 × 2 ( ℝ ) and write down the general element A in V along with its additive inverse − A .
Generalize the previous exercise to find the zero vector and additive inverse of the general element of M m × n ( ℝ ) . 16. Determine the zero vector in the vector space V = M 4 × 2 ( ℝ ) and write down the general element A in V along with its additive inverse − A .
Solution Summary: The author explains the zero vector and additive inverse of the general element of M_mtimes n(R).
Generalize the previous exercise to find the zero vector and additive inverse of the general element of
M
m
×
n
(
ℝ
)
.
16. Determine the zero vector in the vector space
V
=
M
4
×
2
(
ℝ
)
and write down the general element
A
in
V
along with its additive inverse
−
A
.
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.
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Linear Equation | Solving Linear Equations | What is Linear Equation in one variable ?; Author: Najam Academy;https://www.youtube.com/watch?v=tHm3X_Ta_iE;License: Standard YouTube License, CC-BY