Answer:
The parent graph is given below as
[tex]y=2^x[/tex]
By translating the graph 3 units up, we will use the relation below
[tex]\begin{gathered} y=f(x)+k \\ k=3 \\ y=f(x)+3 \\ y=2^x+3 \end{gathered}[/tex]
By translating the graph 4 units to the left, we will use the relation below
[tex]\begin{gathered} y=f(x) \\ y=f(x+k) \\ k=4 \\ y=2^x+3 \\ y=2^{x+4}+3 \end{gathered}[/tex]
Hence,
By graphing the function above, we will have the graph to be
Therefore,
The equation of the transformed equation is
[tex]\Rightarrow y=2^{x+4}+3[/tex]
By completing a table of 5 points, we will have
[tex]\begin{gathered} y=2^{x+4}+3 \\ x=1 \\ y=2^{1+4}+3 \\ y=2^5+3=32+3=35 \\ (1,35) \\ \\ x=2 \\ y=2^{x+4}+3 \\ y=2^{2+4}+3 \\ y=2^6+3=64+3=67 \\ (2,67) \\ x=0 \\ y=2^{x+4}+3 \\ y=2^{0+4}+3 \\ y=2^4+3=16+3=19 \\ (0,19) \\ \\ \text{when x=3} \\ y=2^{x+4}+3 \\ y=2^{3+4}+3 \\ y=2^7+3=128+3=131 \\ (3,131) \\ \\ \text{when x=4} \\ y=2^{x+4}+3 \\ y=2^{4+4}+3 \\ y=2^8+3=256+3=259 \\ (4,259) \end{gathered}[/tex]
Hence,
The horizontal asymptotes is
[tex]y=3[/tex]
