What is the complex conjugate of $10 + 6 i$ $10+6i$ ?

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What is the complex conjugate of $10 + 6 i$ $10+6i$ ?

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Answer 1 · 2015-11-21T02:44:18

$10 - 6 i$ $10-6i$

Explanation:

The conjugate of $a + b$ $a+b$ is $a - b$ $a-b$ . Example: the conjugate of $3 x + 6$ $3x+6$ is $3 x - 6$ $3x-6$ .

The complex conjugate is the exact same, except it includes $i$ $i$ (the square root of $- 1$ $-1$ ). The conjugate of $a + b i$ $a+bi$ is $a - b i$ $a-bi$ . Therefore, the complex conjugate of $10 + 6 i$ $10+6i$ is $10 - 6 i$ $10-6i$ .

Conjugates, especially complex conjugates, can prove very useful. For example, if $10 + 6 i$ $10+6i$ were the denominator of a fraction, you could multiply it by $10 - 6 i$ $10-6i$ to get $100 - 6 i^{2} = 106$ $100-6i^2=106$ . Complex conjugates are a useful way to clear out the complex $i$ $i$ from a denominator or other inopportune place.

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What is the complex conjugate of $10 + 6 i$ $10+6i$ ?

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Science

Math

Humanities

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What is the complex conjugate of 10+6i10+6i?

1 Answer

Explanation:

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Impact of this question

What is the complex conjugate of $10 + 6 i$ $10+6i$ ?