Respuesta :
A function that represents the exponential function f(x)= 3 to the power of x after a vertical stretch by a factor of 8 and a reflection across the x-axis is [tex]f(x) = -8(3^x)[/tex] .
Step-by-step explanation:
Here we have to make A function that represents the exponential function f(x)= 3 to the power of x after a vertical stretch by a factor of 8 and a reflection across the x-axis . Let's find out:
We have ,
- A function that represents the exponential function f(x)= 3 to the power of x
Following is the equation for above statement :
⇒ [tex]f(x) = 3^x[/tex]
- A vertical stretch by a factor of 8
Following is the equation for above statement :
⇒ [tex]f(x) = 8(3^x)[/tex]
- A reflection across the x-axis
Following is the equation for above statement :
⇒ [tex]f(x) = 8(3^x)(-1)[/tex]
⇒ [tex]f(x) = -8(3^x)[/tex]
Therefore , A function that represents the exponential function f(x)= 3 to the power of x after a vertical stretch by a factor of 8 and a reflection across the x-axis is [tex]f(x) = -8(3^x)[/tex] .
