Correct Answer:
3rd option is the correct answer
Solution:
The zeros of the polynomial are -1,1 and 3. The multiplicity of 3 is 2. So the polynomial can be expressed as:
[tex]y=a (x-3)^{2}(x-1)(x+1) [/tex]
The y-intercept of the polynomial is -18. This means the polynomial passes through the point (0,-18). Therefore, y must be -18 when x = 0. Using these values of x and y in previous equation we get:
[tex]-18=a (0-3)^{2}(0-1)(0+1) \\ \\
-18=-9a \\ \\
a=2 [/tex]
The final equation of the polynomial becomes:
[tex]y=2 (x-3)^{2}(x-1)(x+1) [/tex]
