Which of the following options is an equivalent function to f(x) = 3(2)3^x?
A.f(x)=3(8)^x
B.f(x)= 24^x
C.f(x)= 27(8)^x
D.f(x)= 3(8x)
hold on i going to try to help you give me a minute to work this problem out :)
the answer is A have a Great Day :)
The way you typed it,
f(x) = 3(2)3^x
= 6(3^x)
none of the given choices are correct, unless you have a typo
Thank You so much
she means 3 * 2^(3x) I think
To find the equivalent function to f(x) = 3(2)3^x, we need to simplify the expression.
First, let's look at f(x) = 3(2)3^x. Here, we have two parts: 3(2) and 3^x.
We can simplify 3(2) as 6, so our expression becomes f(x) = 6 * 3^x.
Now, let's examine the given options to find the equivalent function:
A. f(x) = 3(8)^x
B. f(x) = 24^x
C. f(x) = 27(8)^x
D. f(x) = 3(8x)
Comparing the options to our simplified expression, we can eliminate options A and B because they do not match.
Option C, f(x) = 27(8)^x, is not equivalent since 27 is not the same as 6. Therefore, we can eliminate this option as well.
The only option left is D, f(x) = 3(8x). This option matches our simplified expression, f(x) = 6 * 3^x.
Therefore, the correct answer is D. The equivalent function to f(x) = 3(2)3^x is f(x) = 3(8x).