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GreenPrint
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Why does
(5 i)/(3 (1-i)) = -5/6+(5 i)/6
(5 i)/(3 (1-i)) = -5/6+(5 i)/6
A rational imaginary function is a mathematical expression that contains both real and imaginary components, and can be written as a ratio of two polynomials with complex coefficients. It represents a relationship between two variables, where one variable is a complex number and the other is a real number.
To simplify a rational imaginary function, you can use algebraic techniques such as factoring, removing common factors, and simplifying exponents. Additionally, you can use the properties of complex numbers, such as the conjugate property, to simplify the expression.
The steps to simplify a rational imaginary function are as follows:
Yes, for example, let's simplify the rational imaginary function (3+5i)/(2+3i).
Simplifying rational imaginary functions is important because it allows us to better understand the relationship between two variables and make calculations easier. Additionally, simplified expressions are more efficient and can help us identify patterns and solve problems more effectively.