If z - 3 + 2i is less than or equal to 4 then the difference between the greatest and least value of mod z
Answers
Answer:
4 + √13
Step-by-step explanation:
|z-z₀| ≤ c represents the entire circular region, not just the curve of
circle(its entire area is included) , where center of circle is z₀ and radius
of circle is c.
|z-z₀| = c just represents the circle(i.e the circumference alone)
Note:
greatest value and the least value of z doesn't make any sense , since
Order is not defined for complex numbers(i.e., we cannot compare
compare complex numbers)
So, it should be modulus value of z , |z|(distance from origin).
Maximum value of |z| = c + √(a² + b²) , when z is situated at the farthest
point from origin along the line joining origin and center.
When it comes to minimum value , since entire circular region is
included, even z could be at origin itself and hence minimum value of |z|
would be 0.
here, |z - 3 + 2i| is similar to |z - z₀| , where z₀ = 3 - 2i
and c is 4.
now, if |Z - 3 + 2i| ≤ 4 ,
maximum value of |z| = 4 + √13
and minimum value of |z| = 0
hence, difference of maximum to minimum = (4 + √13) - 0 = 4 + √13
Answer:
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