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Determine the cost of parking for each given amount of time. 5 minutes costs $ 1 hour costs $ 1 hour and 50 minutes costs $ 2 hours costs $ 2 hours and 1 minute costs $ 3 and a half hours costs $ ( it is $3 per hour or fraction of an hour)

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Answer:

5 minutes costs $0.25;

1 hour costs $3;

1 hour and 50 minutes costs $5.5

2 hours costs $6;

2 hours and 1 minute costs $6.05;

3 and a half hours costs $10.5

Explanation:

Given the cost of parking for each hour is $3

Therefore, 1 hour = $3

By principle of unitary method;

a)1 hour (60 minutes) = $ 3

   5 minutes = [tex]\frac{3 \times 5}{60}[/tex]

     = $0.25

b)1 hour (60 minutes) = $3

   1 hour 50 minutes = 60+50 minutes = 110 minutes =[tex]\frac{3 \times 110}{60}[/tex]

    = $5.5

c)1 hour (60 minutes) = $3

  2 hours (120 minutes) = [tex]\frac{3 \times 120}{60}[/tex]

   = $6

d) 1 hour (60 minutes) = $3

  2 hours 1 minutes = 120 + 1 = 121 minutes = [tex]\frac{3 \times 121}{60}[/tex]

  = $6.05  

e) 1 hour (60 minutes) = $3

   3 and half hours = (3× 60) +30 = 210 minutes =[tex]\frac{3 \times 210}{60}[/tex]

  = $10.5

Therefore, 5 minutes costs $0.25; 1 hour costs $3; 1 hour and 50 minutes costs $5.5; 2 hours costs $6; 2 hours and 1 minute costs $6.05; 3 and a half hours costs $10.5

Answer:

Determine the cost of parking for each given amount of time.

5 minutes costs $ 3

1 hour costs $ 3

1 hour and 50 minutes costs $ 6

2 hours costs $ 6

2 hours and 1 minute costs $ 9

3 and a half hours costs $12

Step-by-step explanation:

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