Find the square roots of – 5 – 12i - Mathematics

प्रश्न

Find the square roots of – 5 – 12i

बेरीज

उत्तर

Let `sqrt(- 5 - 12"i")` = a + ib

Squaring on both sides

– 5 – 12i = (a + ib)²

– 5 – 12i = a² – b² + 2iab

Equating real and imaginary parts

a² – b² = – 5

2ab = – 12

(a² + b²)² = (a² – b²)² + 4a²b²

= (– 5)² + (– 12)² = 169

∴ a² + b² = 13

Solving a² – b² = – 5 and a² + b² = 13

We get a² = 4, b² = 9

a = ± 2, b = ± 3

Since 2ab = – 12 < 0, a, b are of opposite signs.

∴ When a = ± 2, b = ± 3

Now `sqrt(- 5 - 12"i")` = ± (2 – 3i)

Aliter:

Square root of – 5 – 12i

Let a + ib = – 5 – 12i

a = – 5, b = – 12

|z| = `sqrt(5^2 + 12^2)`

= `sqrt(169)`

= 13

`sqrt("a" + "ib") = +- [sqrt((sqrt("a"^2 + "b"^2) + "a")/2) + "i" "b"/"b"| sqrt((sqrt("a"^2 + "b"^2) - "a")/2)]`

= `+- [sqrt((13 - 5)/2) - "i" sqrt((13 + 5)/2)]`

= ± (2 – 3i).

shaalaa.com

Modulus of a Complex Number

या प्रश्नात किंवा उत्तरात काही त्रुटी आहे का?

Q 10. (iii)Q 10. (ii)Q 1

पाठ 2: Complex Numbers - Exercise 2.5 [पृष्ठ ७२]

APPEARS IN

सामाचीर कलवी Mathematics - Volume 1 and 2 [English] Class 12 TN Board

पाठ 2 Complex Numbers
Exercise 2.5 | Q 10. (iii) | पृष्ठ ७२

संबंधित प्रश्‍न

Find the modulus of the following complex numbers

`(2"i")/(3 + 4"i")`

Find the modulus of the following complex numbers

`(2 - "i")/(1 + "i") + (1 - 2"i")/(1 - "i")`

If |z| = 3, show that 7 ≤ |z + 6 – 8i| ≤ 13

If |z| = 1, show that 2 ≤ |z² – 3| ≤ 4

If |z| = 2 show that the 8 ≤ |z + 6 + 8i| ≤ 12

If z₁, z₂ and z₃ are three complex numbers such that |z₁| = 1, |z₂| = 2, |z₃| = 3 and |z₁ + z₂ + z₃| = 1, show that |9z₁z₂+ 4z₁z₃ + z₂z₃| = 6

If the area of the triangle formed by the vertices z, iz, and z + iz is 50 square units, find the value of |z|

Find the square roots of 4 + 3i

Find the square roots of – 6 + 8i