Question 968069
if the polynomial has zeroes at x = 1 and x = -3, then the value of the polynomial would have to be 0 when you replace x with either 1 or -3.


you would get:


f(1) = 0 and f(-3) = 0


start with your polynomial and set it to 0.


you will get:


x^4+ax^2+bx-9 = 0


replace x with 1 and the equation becomes:


1^4 + a*1 + b*1 - 9 = 0
simplify to get:
1 + a + b - 9 = 0
combine like terms to get:
a + b - 8 = 0
add 8 to both sides of the equation to get:
a + b = 8


replace x with -3 and the equation becomes:
(-3)^4 + a*(-3)^2 + b*(-3) - 9 = 0
simplify this to get:
81 + 9a - 3b - 9 = 0
combine like terms to get:
72 + 9a - 3b = 0
subtract 72 from both sides of the equation to get:
9a - 3b = -72


you have 2 equations that need to be solved simultaneously.
they are:
a + b = 8
9a - 3b = -72


multiply both sides of the first equation by 9 to get:


9a + 9b = 72
9a - 3b = -72


subtract the second equation from the first to get:


12b = 144


solve for b to get b = 12


go back to the first equation and solve for a to get:
a + b = 8 becomes:
a + 12 = 8
solve for a to get:
a = 8 - 12 = -4


you have:


a = -4
b = 12


replace those values in the original equation of x^4+ax^2+bx-9 = 0 to get:
x^4 -4 * x^2 + 12 * x - 9 = 0




if you graph the equation using a graphing calculator that tells you the zero points, your graph will look like this:


<img src = "http://theo.x10hosting.com/2015/050401.jpg" alt="$$$" </>



another way would have been to evaluate the equation at f(1) and f(-3) when the value of a was -4 and the value of b was 12.


f(1) and f(-3) should both have been equal to 0.