x%2B(2%2B3i)y%3D10-7i.jpeg "(4-5i)x+(2+3i)y=10-7i")
Solving Complex Equations: (4-5i)x + (2+3i)y = 10-7i
This article will guide you through the process of solving a complex equation involving variables. We'll focus on the equation (4-5i)x + (2+3i)y = 10-7i.
Understanding Complex Numbers
Before we dive into the solution, let's clarify a few key points about complex numbers:
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Complex Numbers: They consist of two parts: a real part and an imaginary part. They are typically written in the form a + bi, where 'a' is the real part and 'b' is the imaginary part. 'i' represents the imaginary unit, where i² = -1.
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Operations on Complex Numbers: Addition, subtraction, multiplication, and division can be performed on complex numbers, following specific rules.
Solving the Equation
Our goal is to find the values of x and y that satisfy the given equation. To achieve this, we'll use the following steps:
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Separate the Real and Imaginary Parts: We'll group the terms with the real parts and the terms with the imaginary parts.
- Real part: (4x + 2y)
- Imaginary part: (-5x + 3y)i
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Equate the Real and Imaginary Parts: For the equation to hold true, both the real and imaginary parts on both sides must be equal.
- 4x + 2y = 10
- -5x + 3y = -7
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Solve the System of Equations: Now we have a system of two linear equations with two unknowns. We can solve this using methods like:
- Substitution: Solve one equation for one variable and substitute it into the other equation.
- Elimination: Multiply one or both equations by constants to make the coefficients of one variable the same, then add or subtract the equations to eliminate that variable.
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Obtain the Values of x and y: After solving the system of equations, we'll find the values of x and y that satisfy the original complex equation.
Example Solution
Let's use the elimination method to solve the system of equations:
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Multiply the first equation by 5 and the second equation by 4:
- 20x + 10y = 50
- -20x + 12y = -28
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Add the two equations:
- 22y = 22
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Solve for y:
- y = 1
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Substitute y = 1 into either of the original equations and solve for x:
- 4x + 2(1) = 10
- 4x = 8
- x = 2
Therefore, the solution to the equation (4-5i)x + (2+3i)y = 10-7i is x = 2 and y = 1.
Conclusion
Solving complex equations involving variables requires a systematic approach. By separating the real and imaginary parts, forming a system of equations, and utilizing methods like elimination or substitution, we can find the values of the variables that satisfy the given equation.