To simplify the expression 2 ÷ (2 + 5i), we can multiply both the numerator and the denominator by the complex conjugate of the denominator. The complex conjugate of 2 + 5i is 2 – 5i.
By doing this, we can eliminate the imaginary part from the denominator:
2 2 - 5i
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2 + 5i 2 - 5iThis gives us:
2(2 - 5i)
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(2 + 5i)(2 - 5i)Now, let’s calculate the denominator:
(2 + 5i)(2 - 5i) = 2² - (5i)²
= 4 - 25(-1)
= 4 + 25
= 29Next, for the numerator:
2(2 - 5i) = 4 - 10iPutting it all together, we receive:
4 - 10i
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29So, the simplified form of the original expression 2 ÷ (2 + 5i) is:
4 - 10i
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29This can also be expressed as:
4/29 - (10/29)iIn conclusion, the simplified expression is:
4/29 - (10/29)i