fill in the equation for this function. y = 2(x - ?)^4 +

fill in the equation for this function. y = 2(x - ?)^4 +

fill in the equation for this function. y = 2(x - ?)^4 +

Answer

Explanation:

Step1: Identify vertex form of function

The general form of a quartic function in vertex - form is $y = a(x - h)^4 + k$, where $(h,k)$ is the vertex of the function.

Step2: Locate the vertex

From the graph, the vertex of the function is at the point $(- 3,-1)$.

Step3: Determine the values of h and k

For the vertex $(h,k)=(-3,-1)$, we have $h=-3$ and $k = - 1$.

Answer:

$y = 2(x-(-3))^4+(-1)=2(x + 3)^4-1$. So the first blank is $-3$ and the second blank is $-1$.