during one month of cell phone use, Noah used 200 anytime minutes and 400 text messages, and paid $80. the next month, he used 150 anytime minutes and 350 text messages, and paid $67.50. which statement is true?
a) each text message costs 5 cents more than each anytime minute
b) each anytime minute costs 10 cents more than each text message
c) a text message and an anytime minute each costs 25 cents
d) each text message costs double the amount of an anytime minute

The statement A is true since on forming the quadratic equations formed you will find the cost of a message being 15 cents and that of anytime as 10 cents.

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JeanaShupp JeanaShupp · Answer 2 · 2019-01-07T11:03:01+01:00

Answer: a) each text message costs 5 cents more than each anytime minute

Step-by-step explanation:

Let x be the cost of anytime minutes and y be the cost of text messages.

Then for the first month, equation for the total amount Noah paid

[tex]200x+400y=80\\\Rightarrow5x+10y=2..\text{[divide 20 on both sides]}\\\Rightarrow15x+30y=6....\text{[multiply 3 on both sides]}[/tex]...(1)

For the second month, equation for the total amount Noah paid

[tex]150x+350y=67.5\\\Rightarrow15x+35y=6.75....\text{[divide 10 on both sides]}[/tex]....(2)

Now subtract equation (1) from equation (2), we get

[tex]5y=0.75\\\Rightarrow\ y=0.15[/tex]

Put y=0.15 in (1), we get

[tex]5x+10(0.15)=2\\\Rightarrow5x+1.5=2\\\Rightarrow\ x=\frac{2-1.5}{5}=0.10\\\Rightarrow\ x=0.10[/tex]

Thus, the cost of anytime minutes(x)= $0.10= 10 cents

and the cost of test messages(y)=$0.15=15 cents

Difference=15-10=5 cents

Hence, each text message costs 5 cents more than each anytime minute.