math
posted by nancy .
Find a polynomial with integer coefficients such that (sqrt3 + sqrt5) is a root of the polynomial

I thought that question was all cleared up
http://www.jiskha.com/display.cgi?id=1267933399 
its sqrt 3+ sqrt5. not 3+ sqrt5
Respond to this Question
Similar Questions

math
find a polynomial with integer coefficients such that square root of 3 + square root of 5 is a root of the polynomial 
math
find a polynomial with integer coefficients such that square root of 3 + square root of 5 is a root of the polynomial 
math
Find a polynomial with integer coefficients such that (sqrt3 + sqrt5) is a root of the polynomial 
PreCalculus
Find a polynomial function with integer coefficients with degree 4, one root 3+radical2, and another root 43i. I got x^414x^3+80x^2206x+175 I'm I correct? 
Math (Algebra)
A number is called algebraic if there is a polynomial with rational coefficients for which the number is a root. For example,√2 is algebraic because it is a root of the polynomial x^2−2. The number √2+√3+√5 … 
algebra!!!! please help me!!!!
A number is called algebraic if there is a polynomial with rational coefficients for which the number is a root. For example, √2 is algebraic because it is a root of the polynomial x^2−2. The number √(2+√3+√5)is … 
heeeeeeeeelp math
Find the largest possible number of distinct integer values {x_1,x_2,…,x_n}, such that for a fixed reducible degree 4 polynomial with integer coefficients, f(x_i) is prime for all i? 
plsheeeeeeeeeeelp math
Find the largest possible number of distinct integer values {x_1,x_2,…,x_n}, such that for a fixed reducible degree 4 polynomial with integer coefficients, f(x_i) is prime for all i? 
heeeelp math
Find the largest possible number of distinct integer values {x_1,x_2,…,x_n}, such that for a fixed reducible degree 4 polynomial with integer coefficients, f(x_i) is prime for all i? 
math
For every positive integer n, consider all monic polynomials f(x) with integer coefficients, such that for some real number a x(f(x+a)−f(x))=nf(x) Find the largest possible number of such polynomials f(x) for a fixed n<1000. …