Answer:
The choice that matches the graph that is given to us is:
Graph D.
Step-by-step explanation:
We know that a exponantial function is defined as:
[tex]f(x)=ab^x[/tex]
If a>0
Then it is a exponential growth i.e. increasing if b>1
and is a exponential decay if: 0<b<1
Similarly if a<0
then it is a exponential decay or decreasing function if b>1
and it is a exponential growth or increasing function if 0<b<1
We are given a function f(x) as:
[tex]f(x)=3\cdot 2^x[/tex]
We see that a=3>0 and b=2>1
Hence, the graph is a exponential growth i.e. the graph must be increasing for increasing values of x.
- Hence, Graph A and Graph B won't be the graph of this function
( Since both the graph are a graph of decreasing function)
then, [tex]f(x)=3\cdot 2^0\\\\\\i.e.\\\\\\f(x)=3\ (since,\ 2^0=1)[/tex]
Hence, we see that this condition is not satisfied in Graph C.
( Because at x=0 the graph passes through f(x)=1 i.e. the point (0,1) and not (0,3) )
Hence, graph C is also not the graph of this function.
So, we are left with graph D.
When we plot the graph of the function we see that it matches:
Graph D.
