-(4-5i)%2B(-3%2B2i).jpeg "(2-3i)-(4-5i)+(-3+2i)")
Simplifying Complex Numbers: (2 - 3i) - (4 - 5i) + (-3 + 2i)
This article will walk you through the process of simplifying the complex number expression: (2 - 3i) - (4 - 5i) + (-3 + 2i)
Understanding Complex Numbers
Complex numbers are numbers that can be expressed in the form a + bi, where:
- a and b are real numbers.
- i is the imaginary unit, defined as the square root of -1 (i.e., i² = -1).
Simplifying the Expression
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Distribute the negative signs: (2 - 3i) - (4 - 5i) + (-3 + 2i) = 2 - 3i - 4 + 5i - 3 + 2i
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Combine real and imaginary terms separately: (2 - 4 - 3) + (-3 + 5 + 2)i
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Simplify: -5 + 4i
The Final Answer
The simplified form of the complex number expression (2 - 3i) - (4 - 5i) + (-3 + 2i) is -5 + 4i.
Key Points to Remember
- Treat complex numbers like binomials: When adding or subtracting complex numbers, treat the real and imaginary parts separately.
- Simplify by combining like terms: Combine the real terms and the imaginary terms.
- Express the answer in the form a + bi: The final answer should be expressed in the standard complex number format.