find the real and imaginary part of (2-3i)
Answers
Step-by-step explanation:
Real part => 2
Imaginary part => -3
any complex number in x+iy form, the real part is 'x' (which here is 2) and imaginary part is the coefficient of 'i' (which here is -3).
Hope it helps:)
The real and imaginary part of (2 - 3i) are 2 and - 3 respectively
Given :
The complex number 2 - 3i
To find :
The real and imaginary part of (2 - 3i)
Concept :
A complex number z = a + ib is defined as an ordered pair of Real numbers ( a, b)
Of the ordered pair (a, b) the first component a is called Real part of z and the second component b is called Imaginary part of z
Solution :
Step 1 of 2 :
Write down the given complex number
The given complex number is 2 - 3i
Step 2 of 2 :
Find the real and imaginary part
The complex number z = 2 - 3i is defined as an ordered pair of Real numbers ( 2 , - 3)
Of the ordered pair ( 2 , - 3) the first component 2 is called Real part of z and the second component - 3 is called Imaginary part of z
Real part of 2 - 3i = 2
Imaginary part of 2 - 3i = - 3
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