Answer:
Following is the conclusion and matching each tile with answer:
A. vertical stretch of a factor of 3 → g ( x ) = 3 (5)ˣ
B. vertical compression of a factor of 1/3 → g ( x ) = 1/3 (5)ˣ
C. horizontal stretch of a factor of 3 → [tex]g(x) = 5^{\frac{1}{3}x}[/tex]
D. horizontal compression of a factor of 1/3 → [tex]g(x) = 5^{3x}[/tex]
Step-by-step explanation:
let us suppose a function f ( x ), and a new function g ( x ) = a f ( x )
When a function is multiplied by a positive constant, let say 'a', you normally get a function the graph of which is vertically compressed or stretched with respect to the graph of the original function.
- If the value of constant 'a' is greater than 1, the graph is vertically stretched.
- If the value of constant 'a' is greater than 0 but lesser than 1, the graph will be vertically compressed.
So, the function g ( x ) = 1/3 (5)ˣ is compressed vertically by 1/3, as the multiplied value of constant 'a' = 1/3 is less than 1.
And, the function g ( x ) = 3 (5)ˣ is stretched vertically by 3, as the multiplied value of constant 'a' = 3 is greater than 1.
Now, let us suppose a function f ( x ), and a new function g ( x ) = f ( bx )
Observe the certain changes right inside the function. In other words, when the input of a function is multiplied by a positive constant, let say 'b', we get a function the graph of which is horizontally compressed or stretched.
- If the value of constant 'b' is greater than 1, the graph is horizontally compressed by a factor of 1/b.
- If the value of constant 'b' is greater than 0 but lesser than 1, the graph will be horizontally stretched 1/b.
So, the graph [tex]g(x) = 5^{\frac{1}{3}x}[/tex] is horizontally stretched by 3, as the value of constant 'b' is greater than 0 but lesser than 1.
And, the graph [tex]g(x) = 5^{3x}[/tex] is horizontally compressed by 1/3, as the value of constant 'b' is greater than 1.
Following is the conclusion and matching each tile with answer:
A. vertical stretch of a factor of 3 → g ( x ) = 3 (5)ˣ
B. vertical compression of a factor of 1/3 → g ( x ) = 1/3 (5)ˣ
C. horizontal stretch of a factor of 3 → [tex]g(x) = 5^{\frac{1}{3}x}[/tex]
D. horizontal compression of a factor of 1/3 → [tex]g(x) = 5^{3x}[/tex]
Keywords: vertical stretch, vertical compression, horizontal stretch, horizontal compression
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