(1-i)-(3-i)(3%2Bi).jpeg "(2-3i)(1-i)-(3-i)(3+i)")
Simplifying Complex Expressions
This article will guide you through the process of simplifying the complex expression: (2-3i)(1-i)-(3-i)(3+i).
Understanding Complex Numbers
Complex numbers are numbers that can be expressed in the form a + bi, where 'a' and 'b' are real numbers, and 'i' is the imaginary unit, where i² = -1.
Simplifying the Expression
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Expand the products:
- (2-3i)(1-i) = 2 - 2i - 3i + 3i² = 2 - 5i + 3(-1) = -1 - 5i
- (3-i)(3+i) = 9 + 3i - 3i - i² = 9 - (-1) = 10
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Substitute the simplified products into the original expression:
- (-1 - 5i) - 10
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Combine like terms:
- -11 - 5i
Final Answer
The simplified form of the expression (2-3i)(1-i)-(3-i)(3+i) is -11 - 5i.