Let be a complex number such that and . Then the value of is equal to:
- A
- B
- C
- D
Let be a complex number such that and . Then the value of is equal to:
Correct answer:A
Standard Method
Given: and .
Find: The value of .
Concept: The given conditions represent two circles in the Argand plane. If two circles with equal radii touch externally, the common point is the midpoint of their centres.
Step 1: Identify the centres of the circles.
Distance between centres:
Since the distance between centres equals the sum of radii, the circles touch externally.
Step 2: Find the point of contact.
Hence,
Step 3: Evaluate the expression.
Now,
Therefore, the value of the expression is . The correct option is A.
Midpoint Observation
Given: Both loci are circles of radius .
Find: The value of .
The centres are and . Their distance is
which is exactly the sum of the radii. So the circles touch externally, and the common point is the midpoint of the two centres.
Thus . Substituting this into the expression gives .
Therefore, the correct option is A.
Treating the equations as unrelated algebraic conditions instead of loci in the Argand plane. This misses the circle interpretation. First identify each modulus equation as a circle with a centre and radius.
Using the wrong centre for . Since is inside the modulus, the centre is , not . Always rewrite the expression in the form .
Not checking why the midpoint can be used. The midpoint is valid here because the circles have equal radii and the distance between centres equals the sum of radii, so they touch externally. Verify this before taking the midpoint.
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