How do you tell whether #f(x)=(6/5)^-x# is an exponential growth or decay?

2 Answers
May 4, 2017

Given the form #f(x)=A^-x#

If #A>1# #-># exponential decay
If #A<1# #-># exponential growth

Explanation:

To understand why this makes sense, let's expand the function that is given. To do this, we need to keep in mind two properties of exponents:

First, #(a/b)^x=a^x/b^x#

Second, #a^-x=1/a^x#

Using the first property, expand the equation given in the problem:

#f(x)=(6/5)^-x=6^-x/5^-x#

Now, use the second property to flip the fraction and drop the negative sign from the exponent:

#f(x)=5^x/6^x#

Now that we've gotten this far, let's consider what will happen to the value of #f(x)# as #x->oo# by looking at the graphs of #5^x# and #6^x#.

Graph of #5^x#
graph{5^x [-5, 5, -1.47, 5]}

Graph of #6^x#
graph{6^x[-5, 5, -1.47, 5]}

Looking at the difference between these two graphs, #6^x# is steeper than #5^x#. This implies that the denominator of #f(x)=5^x/6^x# will grow faster, making #f(x)# smaller as #x# increases (exponential decay).

If #6^x# were in the numerator, the opposite would be true, and we would see exponential growth.

May 4, 2017

Decay

Explanation:

Given:#" "f(x)=(6/5)^(-x)#

Set as:# y=(6/5)^(-x)#

The index (power) being negative is another way of writing:

#y=(color(white)(.)1color(white)(.))/(6/5)^x#

This is the same as:

#y=(5/6)^x" "=5^x/6^x#

As #x# increases then #6^x# becomes increasingly greater that #5^x#

Thus the whole will become less and less as #x# becomes greater and greater eventually approaching a particular value.

Thus we have #y=5^x/6^x->k# as #x# increases

And #lim_(x->oo)y=lim_(x->oo)k=0#

Thus it is decay

Tony B