How do you determine if the equation #y = 3(0.4)^x# represents exponential growth or decay?

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Answer 1 · 2016-07-17T18:09:28

Take a look at the equation: #y = a * b^x#

When #b > 1#, the equation represents exponential growth. When #b# is between #0# and #1#, the equation represents exponential decay.

The equation #y=3(0.4)^x# represents exponential decay, since #b#, or #0.4#, is greater than #0# and less than #1#.

Look at the graph to confirm exponential decay.
graph{3(0.4)^x [-6.71, 13.29, -2.17, 8.25]}

Answer 2 · 2016-07-17T18:13:19

The eqn. represents decay.

We know that, the function #a^x# is #uarr# for #a>1# and it is #darr# for #0<,a<,1#

#:. (0.4)^x# is #darr# & so is #y=3(0.4)^x#

Therefore, the eqn. represents decay.