Liam is using sequences to compare the growth rates of h(x)=1.2x and j(x)=1.2x. Which statement correctly describes how Liam should do this and what he will observe?(1 point)

Question

Liam is using sequences to compare the growth rates of h(x)=1.2x and j(x)=1.2x. Which statement correctly describes how Liam should do this and what he will observe?(1 point)
Responses

Liam should compare the rates of change of the terms in both sequences. The growth rate of h(x)=1.2x will quickly surpass the growth rate of j(x)=1.2x.
Liam should compare the rates of change of the terms in both sequences. The growth rate of  h left parenthesis x right parenthesis equals 1.2 x  will quickly surpass the growth rate of  j left parenthesis x right parenthesis equals 1.2 superscript x baseline .

Liam should look at where one sequence has terms greater than the terms in the other sequence. The growth rate of h(x)=1.2x is greater than the growth rate of j(x)=1.2x when its terms are greater.  
Liam should look at where one sequence has terms greater than the terms in the other sequence. The growth rate of  h left parenthesis x right parenthesis equals 1.2 x  is greater than the growth rate of  j left parenthesis x right parenthesis equals 1.2 superscript x baseline  when its terms are greater.

Liam should compare the rates of change of the terms in both sequences. The growth rate of j(x)=1.2x will quickly surpass the growth rate of h(x)=1.2x.
Liam should compare the rates of change of the terms in both sequences. The growth rate of  j left parenthesis x right parenthesis equals 1.2 superscript x baseline  will quickly surpass the growth rate of  h left parenthesis x right parenthesis equals 1.2 x .

Liam should look at where one sequence has terms greater than the terms in the other sequence. The growth rate of j(x)=1.2x is only greater than the growth rate of h(x)=1.2x when its terms are greater.

GPT-4o mini · Answer

To correctly describe how Liam should compare the growth rates of the two functions, we need to focus on the forms of the functions provided. The function \( h(x) = 1.2x \) is a linear function, while \( j(x) = 1.2^x \) is an exponential function.

Exponential functions generally grow faster than linear functions as \( x \) increases. Therefore, Liam's analysis should focus on comparing the rates of change of these two functions.

The correct statement is:

Liam should compare the rates of change of the terms in both sequences. The growth rate of \( j(x) = 1.2^x \) will quickly surpass the growth rate of \( h(x) = 1.2x \).

This indicates that as \( x \) increases, \( j(x) \) will grow at a much faster rate than \( h(x) \).