How do you graph #y = 4(2)^x-3 #?

1 Answer
Jul 30, 2016

graph{4*2^x-3 [-10, 10, -5, 5]}
See explanation below.

Explanation:

Start from exponential function #y=2^x#.

It is defined for all real numbers: #-oo < x < +oo#.
It is always positive: #y=2^x > 0#.
It is monotonically increases as #x# runs from #-oo# to #+oo#.
As #x -> -oo#, function asymptotically approaches #0#: #y=2^x -> 0# (while staying positive).
At #x=0# function #y=2^0=1#.
As #x -> +oo#, function #y=2^x -> +oo#.
Here is the graph of #y=2^x#:
graph{2^x [-10, 10, -5, 5]}

Next, let's transform this graph into #y=4*2^x#.
All we do is stretch this graph vertically from X-axis upward.
At #x=0# the function will have a value #y=4*2^0=4#.
Moving to the left, the function will still asymptotically go to #0#.
Moving to the right, the function will still go to #+oo#.
Here is the graph of #y=4*2^x#:
graph{4*2^x [-10, 10, -5, 5]}

Finally, to transform the graph to #y=4*2^x-3#, we have to shift the whole graph down by #3#.
The result is:
graph{4*2^x-3 [-10, 10, -5, 5]}
It asymptotically approaches #-3# from above, when #x->-oo#.
At #x=0# the function #y=4*2^x-3=1#
To the right of #x=0# the function is growing to #+oo#..