Answer:
The absolute value of the product of the zeros of a(t) is 108.
Step by step explanation:
The given polynomial function is
[tex]a(t)=(t-k)(t-3)(t-6)(t+3)[/tex]
Where k is the constant.
To find the zeros of a(t), equate the polynomial equal to zero.
[tex](t-k)(t-3)(t-6)(t+3)=0[/tex]
By using zero product property, equate each factor equal to zero.
[tex]t-k=0[/tex]
[tex]t=k[/tex]
[tex]t-3=0[/tex]
[tex]t=3[/tex]
[tex]t-6=0[/tex]
[tex]t=6[/tex]
[tex]t+3=0[/tex]
[tex]t=-3[/tex]
Therefore the zeros of the function are k, 3, 6 and -3. Since it is given that
[tex]a(2)=0[/tex]
Therefore, 2 is a zero of a(t). So, the value of k is 2.
The product of zeros is
[tex]2\times 3\times 6\times -3=-108[/tex]
The absolute value of the product is 108.