{-4 - j2.5, j2, 4 - j2.5}
{-j2.5, 1, j2.5}
{-j5, j2, 0}
{-4, 1, 4}
Answer is Right!
Answer is Wrong!
The correct answer is A.
The conjugate antisymmetric part of a sequence is defined as follows:
$$x_{an} = \overline{x_{-n}}$$
where $\overline{x}$ denotes the complex conjugate of $x$.
In this case, we have:
$$x[n] = {-4 – j5, 1 + j2, 4}$$
Therefore, the conjugate antisymmetric part of the sequence is:
$$x_{an} = \overline{x_{-n}} = {-4 + j5, 1 – j2, 4}$$
which can be simplified to:
$$x_{an} = {-4 – j2.5, j2, 4 – j2.5}$$
Here is a brief explanation of each option:
- Option A: This is the correct answer. It is the conjugate antisymmetric part of the sequence, as defined above.
- Option B: This is not the correct answer. It is the conjugate symmetric part of the sequence, which is defined as follows:
$$x_{an} = \overline{x_{n}}$$
- Option C: This is not the correct answer. It is the real part of the sequence.
- Option D: This is not the correct answer. It is the imaginary part of the sequence.