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Compare Linear Function 1 with Linear Function 2. Which one has the lesser initial value? Linear Function 1: Lionel’s cell phon...Asked by Lee Hooni 🖤
Compare Linear Function 1 with Linear Function 2. Which one has the lesser initial value?
Linear Function 1: Lionel’s cell phone plan costs $45 per month.
Linear Function 2: The relationship between the number of months Ruby has had her cell phone (x)
and the total cost (y)
is given by y=40x+60
.
(1 point)
Responses
Linear Function 1 has the lesser initial value, with an initial value equal to $45 while Linear Function 2 has an initial value equal to $60.
Linear Function 1 has the lesser initial value, with an initial value equal to $45 while Linear Function 2 has an initial value equal to $60.
Linear Function 1 has the lesser initial value, with an initial value equal to $0 while Linear Function 2 has an initial value equal to $60.
Linear Function 1 has the lesser initial value, with an initial value equal to $0 while Linear Function 2 has an initial value equal to $60.
Linear Function 2 has the lesser initial value, with an initial value equal to $40 while Linear Function 1 has an initial value equal to $45.
Linear Function 2 has the lesser initial value, with an initial value equal to $40 while Linear Function 1 has an initial value equal to $45.
Linear Function 1 has the lesser initial value, with an initial value equal to $0 while Linear Function 2 has an initial value equal to $40.
Linear Function 1: Lionel’s cell phone plan costs $45 per month.
Linear Function 2: The relationship between the number of months Ruby has had her cell phone (x)
and the total cost (y)
is given by y=40x+60
.
(1 point)
Responses
Linear Function 1 has the lesser initial value, with an initial value equal to $45 while Linear Function 2 has an initial value equal to $60.
Linear Function 1 has the lesser initial value, with an initial value equal to $45 while Linear Function 2 has an initial value equal to $60.
Linear Function 1 has the lesser initial value, with an initial value equal to $0 while Linear Function 2 has an initial value equal to $60.
Linear Function 1 has the lesser initial value, with an initial value equal to $0 while Linear Function 2 has an initial value equal to $60.
Linear Function 2 has the lesser initial value, with an initial value equal to $40 while Linear Function 1 has an initial value equal to $45.
Linear Function 2 has the lesser initial value, with an initial value equal to $40 while Linear Function 1 has an initial value equal to $45.
Linear Function 1 has the lesser initial value, with an initial value equal to $0 while Linear Function 2 has an initial value equal to $40.
Answers
There are no human answers yet.
Answered by
GPT-4o mini
To compare the initial values of the two linear functions:
**Linear Function 1**: Lionels's cell phone plan costs $45 per month. This implies that every month, regardless of the number of months, the cost will always start at $45.
**Linear Function 2**: The relationship is given by \( y = 40x + 60 \). To determine the initial value, we can substitute \( x = 0 \) (which represents the starting point when Ruby hasn't had her cell phone plan for any months yet):
- When \( x = 0 \):
\[
y = 40(0) + 60 = 60
\]
So, the initial value of Linear Function 1 is $45, and the initial value of Linear Function 2 is $60.
Comparing these values, we find:
Linear Function 1 has the lesser initial value of $45, while Linear Function 2 has an initial value of $60.
Thus, the correct response is:
**Linear Function 1 has the lesser initial value, with an initial value equal to $45 while Linear Function 2 has an initial value equal to $60.**
**Linear Function 1**: Lionels's cell phone plan costs $45 per month. This implies that every month, regardless of the number of months, the cost will always start at $45.
**Linear Function 2**: The relationship is given by \( y = 40x + 60 \). To determine the initial value, we can substitute \( x = 0 \) (which represents the starting point when Ruby hasn't had her cell phone plan for any months yet):
- When \( x = 0 \):
\[
y = 40(0) + 60 = 60
\]
So, the initial value of Linear Function 1 is $45, and the initial value of Linear Function 2 is $60.
Comparing these values, we find:
Linear Function 1 has the lesser initial value of $45, while Linear Function 2 has an initial value of $60.
Thus, the correct response is:
**Linear Function 1 has the lesser initial value, with an initial value equal to $45 while Linear Function 2 has an initial value equal to $60.**
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