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प्रश्न
Express the following complex numbers in polar form and exponential form:
−1
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उत्तर
Let z = −1 = −1 + 0.i
This is of the form a + bi, where a = −1, b = 0
∴ r = `sqrt("a"^2 + "b"^2)`
= `sqrt((-1)^2 + 0^2)` = 1
Also, cos θ = `"a"/"r" = (-1)/1` = −1
and sin θ = `"b"/"r" = 0/1` = 0
∴ θ = π ...[∵ cos π = −1 and sin π = 0]
∴ the polar form of z = r(cos θ + i sin θ)
= 1(cos π + i sin π)
and the exponential form of z = reiθ
= 1·eiπ
= eπi
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