which transformations of the graph of f(x)=-4^x result in the graph of f(x)=4^x+3?

Answer:
Reflection over the x-axis and shifted 3 units to the left
Step-by-step explanation:
From the parent graph f(x) = [tex]-4^x[/tex], we can conclude that:
1. Reflected over the x-axis because we multiplied by -1 to flip it to positive.
2. Horizontally shifted the graph to the left because of the +3 (take the opposite for horizontal movement)
That is how we get f(x) = [tex]4^{x+3}[/tex].
Edit: I have no idea why the mods and AL2006 reported my answer and deleted it. I still got the same answer. The child function f(x) = [tex]4^{x+3}[/tex], not f(x) = [tex]4^x+3[/tex]