(8-i)/(3-2i)

3 min read Jun 16, 2024
(8-i)/(3-2i)

Simplifying Complex Fractions: (8-i)/(3-2i)

In mathematics, complex numbers often appear in fractions, requiring simplification. This article explores the process of simplifying the fraction (8-i)/(3-2i).

Understanding Complex Fractions

A complex fraction is a fraction where either the numerator, denominator, or both contain complex numbers. Complex numbers are numbers of the form a + bi, where 'a' and 'b' are real numbers, and 'i' is the imaginary unit, defined as the square root of -1.

Simplifying (8-i)/(3-2i)

To simplify this fraction, we employ the technique of multiplying both the numerator and denominator by the conjugate of the denominator. The conjugate of a complex number (a + bi) is (a - bi).

Step 1: Find the Conjugate

The conjugate of (3 - 2i) is (3 + 2i).

Step 2: Multiply Numerator and Denominator

Multiply both the numerator and denominator of the fraction by the conjugate:

[(8 - i) * (3 + 2i)] / [(3 - 2i) * (3 + 2i)]

Step 3: Expand and Simplify

Expand the products in the numerator and denominator:

[(8 * 3) + (8 * 2i) - (i * 3) - (i * 2i)] / [(3 * 3) + (3 * 2i) - (2i * 3) - (2i * 2i)]

Simplify the expressions:

[24 + 16i - 3i + 2] / [9 + 6i - 6i + 4]

Combine real and imaginary terms:

[26 + 13i] / [13]

Step 4: Final Simplification

Divide both the numerator and denominator by 13:

(2 + i)

Therefore, the simplified form of (8-i)/(3-2i) is 2 + i.

Conclusion

Simplifying complex fractions often involves multiplying by the conjugate of the denominator. This process eliminates the imaginary term in the denominator, resulting in a simpler expression. In the case of (8-i)/(3-2i), we successfully simplified it to the complex number 2 + i.

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