0
What else can I help you with?
What is the complex conjugate 3i plus 4?
The complex conjugate of a complex number is obtained by changing the sign of its imaginary part. For the complex number ( 3i + 4 ), which can be expressed as ( 4 + 3i ), the complex conjugate is ( 4 - 3i ).
Find the conjugate of 8 plus 4i.?
The conjugate of a complex number is obtained by changing the sign of its imaginary part. For the complex number (8 + 4i), the conjugate is (8 - 4i).
What is the conjugate of -5 4i?
-9
What is the conjugate of complex number -2?
The conjugate of a complex number is obtained by changing the sign of its imaginary part. The complex number -2 can be expressed as -2 + 0i, where the imaginary part is 0. Therefore, the conjugate of -2 is also -2 + 0i, which simplifies to -2. Thus, the conjugate of the complex number -2 is -2.
What is the conjugate of -8-4i?
The conjugate of -8-4i is -8+4i. It is obtained by changing the sign of the imaginary part of the complex number.
What is the graphical relationship between a conjugate number and a complex number?
Graphically, the conjugate of a complex number is its reflection on the real axis.
What is the conjugate of 8-3i?
11
What is the relationship between a complex number and its conjugate?
When a complex number is multiplied by its conjugate, the product is a real number and the imaginary number disappears.
What is complex conjugate for the number 9-5i?
Complex ; 9 - 5i It conjugate is ' 9 + 5i'.
What is the complex conjugate complex number 8 6i?
Oh, dude, the complex conjugate of 8 + 6i is just flipping the sign of the imaginary part, so it's 8 - 6i. It's like changing your mood from happy to grumpy, but in the world of math. So yeah, that's the deal with complex conjugates.
What is the complex conjugate of the following complex number 7 plus 5i?
The conjugate is 7-5i
What is the conjugate of 6 plus square root 2?
The conjugate of a complex number is formed by changing the sign of its imaginary part. Since (6 + \sqrt{2}) is a real number (with no imaginary part), its conjugate is simply itself: (6 + \sqrt{2}).
