The vertex form:
[tex]y=a(x-h)^2+k\\\\(h,\ k)-vertex[/tex]
Use [tex](a+b)^2=a^2+2ab+b^2\qquad(*)[/tex]
[tex]2x^2+12x+16=2(x^2+6x)+16=2(x^2+2(x)(3))+16\\\\=2(\underbrace{x^2+2(x)(3)+3^2}_{(*)}-3^2)+16=2((x+3)^2-9)+16\\\\=2(x+3)^2+(2)(-9)+16=2(x+3)^2-18+16\\\\=\boxed{2(x-(-3))^2-2}\to h=-3,\ k=-2[/tex]
Answer: (-3, -2).
Other method:
[tex]f(x)=ax^2+bx+c\\\\vertex:(h,\ k)\\\\h=\dfrac{-b}{2a},\ k=f(h)[/tex]
We have
[tex]f(x)=2x^2+12x+16\\\\a=2,\ b=12,\ c=16[/tex]
Substitute:
[tex]h=\dfrac{-12}{(2)(2)}=\dfrac{-12}{4}=-3\\\\k=f(-3)=2(-3)^2+12(-3)+16=2(9)-36+16=18-36+16=-2[/tex]
Answer: (-3, -2).
