Let A = , B = , Then all solutions of equation det(AB) = 0 is
1, - 1, 0, 2
1, 4, 0, - 2
1, - 1, 4, 3
- 1, 4, 0, 3
The value of det A, where
A = , lies
in the closed interval [1, 2]
in the closed interval [0, 1]
in the open interval (0, 1)
in the open interval (1, 2)
The points (- a, - b), (a, b), (0, 0) and (a, ab), are always
collinear
vertices of a parallelogram
vertices of a rectangle
lie on a circle
A.
We have,
Let be an integer,
and I is the identity matrix of order 3. Then,
An = I and An - 1 I
Am I for any positive integer m
A is not invertible
Am = 0 for a positive integer m
Consider the system of equations x + y + z = 0, and . Then, the system of equations has
a unique solution for all values of
infinite number of solutions, if any two of are equal.
a unique solution, if are distinct
more than one, but finite number of solutions depending on values of