Use syntheic division to determine the quotient involving a Complex number. メキト Xti

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**Title: Synthetic Division and Complex Numbers** **Instruction:** Use synthetic division to determine the quotient involving a complex number. **Expression:** \[ \frac{x+1}{x+i} \] **Explanation:** To perform synthetic division with a complex number, the process is similar to using real numbers but requires careful handling of the imaginary unit \(i\). Here, you will divide \(x+1\) by \(x+i\). 1. **Identify the divisor:** \(x + i\) implies the root is \(-i\). 2. **Follow synthetic division steps:** Use \(-i\) to divide the polynomial coefficients, keeping in mind the properties of \(i\) (e.g., \(i^2 = -1\)). 3. **Calculate the quotient:** Continue the division until the remainder is determined. Understanding synthetic division with complex numbers provides insight into dividing polynomials involving imaginary terms.