z-(9-2i)%3D(1%2Bi)z.jpeg "(2-3i)z-(9-2i)=(1+i)z")
Solving Complex Equations: (2-3i)z - (9-2i) = (1+i)z
This article will guide you through solving the complex equation (2-3i)z - (9-2i) = (1+i)z, where 'z' represents a complex number.
Understanding the Problem
The equation involves complex numbers, which are numbers of the form a + bi, where 'a' and 'b' are real numbers and 'i' is the imaginary unit (i² = -1). Our goal is to find the value of 'z' that satisfies the given equation.
Solving the Equation
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Rearrange the equation:
- Move all terms with 'z' to one side: (2-3i)z - (1+i)z = 9 - 2i
- Combine the terms with 'z': [(2-3i) - (1+i)]z = 9 - 2i
- Simplify: (1-4i)z = 9 - 2i
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Isolate 'z':
- Divide both sides of the equation by (1-4i): z = (9-2i) / (1-4i)
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Rationalize the denominator:
- Multiply the numerator and denominator by the conjugate of the denominator (1+4i): z = [(9-2i)(1+4i)] / [(1-4i)(1+4i)]
- Expand the numerator and denominator: z = (9 + 36i - 2i - 8i²) / (1 + 16)
- Simplify using i² = -1: z = (9 + 34i + 8) / 17
- Combine real and imaginary terms: z = (17 + 34i) / 17
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Express in standard form:
- Simplify the fraction: z = 1 + 2i
Conclusion
Therefore, the solution to the equation (2-3i)z - (9-2i) = (1+i)z is z = 1 + 2i. This process involved manipulating the equation, isolating 'z', rationalizing the denominator, and finally expressing the solution in standard form (a + bi).