Respuesta :
multiplying by 4 stretches the graph of g(x)4[x] vertically by a factor of 4
Answer:
The correct option is D) Multiplying by 4 stretches the graph of g(x)=4⌊x⌋ vertically by a factor of 4
Step-by-step explanation:
Consider the provided graph.
Transformation:
- The graph of parent function f(x) move up b unit for f(x)+b.
- The graph of parent function f(x) move down b unit for f(x)-b.
- The graph of parent function f(x) move left b unit for f(x+b).
- The graph of parent function f(x) move right b unit for f(x-b).
- For the given function f(x) the new function g(x) = a f(x) will stretch vertical by factor a if a>1
- For the given function f(x) the new function g(x) = a f(x) will compressed vertical by a factor of a if 0<a<1
Now consider the provided graph of g(x)=4⌊x⌋
The parent function is f(x)=⌊x⌋
The new graph is multiplied by 4 which is grater than 1.
Thus, the graph of the function will stretches vertically by a factor of 4.
Hence, the correct option is D) Multiplying by 4 stretches the graph of g(x)=4⌊x⌋ vertically by a factor of 4
