Answered

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Consider the functions f(x) = 12^x and g(x)= -2(12)^x. Which transformations must be applied to function F to produce the graph of function g?

SELECT ALL CORRECT ANSWERS

Vertical stretch
Vertical Shift
Vertical Compression
Reflection over the x-axis
Horizontal Shift

Consider The Functions Fx 12x And Gx 212x Which Transformations Must Be Applied To Function F To Produce The Graph Of Function G SELECT ALL CORRECT ANSWERS Vert class=

Sagot :

Answer:

Step-by-step explanation:

g(x) = -2f(x)

Vertical stretch                       by virtue of the factor 2

Reflection over the x-axis      by virtue of the factor -1

Answer:

Vertical stretch and Reflection over the x-axis

Step-by-step explanation:

For all the Plato users: Multiplying the function by a constant, in the form , results in a vertical stretch or compression. When , the result is a vertical stretch. When k is negative, the graph also reflects over the x-axis.

In this case, function g is equal to  times function f, which means .

So to produce the graph of function g, function f must be vertically stretched and reflected over the x-axis.

I hope this helps.

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