For z = 2 + 3i verify the following: z-z¯ = 6i

For z = 2 + 3i verify the following:

`"z" - bar"z"` = 6i

बेरीज

z = 2 + 3i

∴ `bar("z")` = 2 – 3i

∴ `"z" - bar"z"` = (2 + 3i) – (2 – 3i)

= 2 + 3i – 2 + 3i

= 6i

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पाठ 1: Complex Numbers - Exercise 1.3 [पृष्ठ १५]

पाठ 1 Complex Numbers
Exercise 1.3 | Q 8. (iv) | पृष्ठ १५

Find the modulus and amplitude of the following complex numbers.

7 − 5i

Find the modulus and amplitude of the following complex numbers.

`sqrt(3) + sqrt(2)"i"`

Find the modulus and amplitude of the following complex numbers.

−8 + 15i

Find the modulus and amplitude of the following complex numbers.

−3(1 − i)

Find the modulus and amplitude of the following complex numbers.

(1 + 2i)² (1 − i)

Find real values of θ for which `((4 + 3"i" sintheta)/(1 - 2"i" sin theta))` is purely real.

If z = 3 + 5i then represent the `"z", bar("z"), - "z", bar(-"z")` in Argand's diagram

Express the following numbers in the form x + iy:

`sqrt(3)(cos pi/6 + "i" sin pi/6)`

Express the following numbers in the form x + iy:

`"e"^((-4pi)/3"i")`

Convert the complex number z = `("i" - 1)/(cos pi/3 + "i" sin pi/3)` in the polar form

For z = 2 + 3i verify the following:

`"z"bar("z")` = |z|²

z₁ = 1 + i, z₂ = 2 − 3i. Verify the following :

`bar("z"_1 - "z"_2) = bar("z"_1) - bar("z"_2)`

z₁ = 1 + i, z₂ = 2 − 3i. Verify the following :

`bar(("z"_1/"z"_2))=bar("z"_1)/bar("z"_2)`

Select the correct answer from the given alternatives:

If arg(z) = θ, then arg `bar(("z"))` =

Select the correct answer from the given alternatives:

If z = x + iy and |z − zi| = 1 then

Answer the following: