Determine Factoring -x^2-81 Over Complex
In mathematics, a factor is a number or algebraic expression that divides another number or expression evenly, leaving no remainder. Here you can check the answer to Determine Factoring -x^2-81 Over Complex.
Ex: x^2+1 (or) x^2+2xi-1
How to Determine Factoring -x^2-81 Over Complex?
The given expression is,-x^2-81
Now Solving the given expression step by step we get,
=(x)(x)+(-9i)(x)+(x)(9i)+(-9i)(9i)
=(x)((x+9i))+(-9i)((x+9i))
=-(x - 9i)(x + 9i)
Therefore, the factorisation of -x^2-81 is -(x - 9i)(x + 9i)
FAQs on Factoring -x^2-81 Over Complex
1. What is the Factoring of -x^2-81?
The Factoring -x^2-81 Over complex numbers is -(x - 9i)(x + 9i).
2. Where can I get the detailed answer to determine factoring -x^2-81 over complex numbers?
You can get detailed solution steps for Factoring Polynomial -x^2-81 over complex numbers on this page.
3. How can I solve Factoring Polynomial -x^2-81 over complex numbers Problem by using Factoring Over Complex Numbers Calculator?
Simply enter the input expression in the above calculator form & tap on the calculate button to solve the expression & get the result in no time via our free online Factoring Over Complex Numbers Calculator