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प्रश्न
Find the square root of the following complex number:
`1 + 4sqrt(3)"i"`
उत्तर
Let `sqrt(1 + 4sqrt(3)"i")` = a + bi, where a, b ∈ R
Squaring on both sides, we get
`1 + 4sqrt(3)"i"` = (a + bi)2 = a2 + b2i2 + 2abi
∴ `1 + 4sqrt(3)"i"` = (a2 – b2) + 2abi ...[∵ i2 = – 1]
Equating real and imaginary parts, we get
a2 – b2 = 1 and 2ab = `4sqrt(3)`
∴ a2 – b2 = 1 and b = `(2sqrt(3))/"a"`
∴ `"a"^2 - ((2sqrt(3))/"a")^2` = 1
∴ `"a"^2 - 12/"a"^2` = 1
∴ a4 – a2 – 12 = 0
∴ (a2 – 4)(a2 + 3) = 0
∴ a2 = 4 or a2 = – 3
But a ∈ R
∴ a2 ≠ – 3
∴ a2 = 4
∴ a = ± 2
When a = 2, b = `(2sqrt(3))/2 = sqrt(3)`
When a = – 2, b = `(2sqrt(3))/(-2) = -sqrt(3)`
∴ `sqrt(1 + 4sqrt(3)"i") = ± (2 + sqrt(3)"i")`
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