kayleeclark09
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The graph of function g is a vertical stretch of the graph of function f ​​by a factor of 10. Which equation describes function g? ​​ g(x)=f(10x) ​ ​ g(x)=110f(x) ​​ g(x)=f(x10) g(x)=10f(x)

Respuesta :

altavistard

Answer:

10f(x)

Step-by-step explanation:  

Given f(x) and its graph, a vertical stretch in the graph is obtained when f(x) is mult. by 10:  10f(x)


JeanaShupp

Answer: [tex]g(x)=10f(x)[/tex]

Step-by-step explanation:

We know that when we vertically stretch the graph of a function h(x) by sacle factor of m, then the new function will becomes :-

[tex]h'(x)=m(h(x))[/tex]

Similarly, if the graph of function g is a vertical stretch of the graph of function f ​​by a factor of 10, then the equation of new function g is given by :-

[tex]g(x)=10f(x)[/tex]

Thus, the equation describes function g is [tex]g(x)=10f(x)[/tex]

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