Question

Peter has to take 80 mg of a drug to control his blood pressure. The following graph shows the initial amount of the drug, and the amount that remains active in Peter’s blood after one, two, three and four days

Answer 1

Given : Peter has to take 80 mg of a drug to control his blood pressure.

graph shows the initial amount of the drug, and the amount that remains active in Peter’s blood after one, two, three and four days  

To Find : How much of the drug remains active at the end of the first day?

6 mg.

12 mg.

26 mg.

32 mg.

At the end of each day which of the following is the approximate percentage of the previous day’s drug that remains active?

50%

80%

20%

40%

Solution:

x - axis represents  number of days

y - axis  represents  amount that remains active in Peter’s blood

From Graph against 1 on x axis   is 32

Hence  drug remains active at the end of the first day  =32 mg

Start of day    End of Day     %

80                     32                 (32/80)* 100  = 40%

32                     12                   (12/32)*100 =   37,5 %

12                      6                    (6/12) * 100  = 50%

Approx. 40%  is correct option

drug remains active at the end of the first day  =32 mg

approximate percentage of the previous day’s drug that remains active 40%

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Answer 2

Answer:

Peter has to take 80 mg of a drug to control his blood pressure.

graph shows the initial amount of the drug, and the amount that remains active in Peter’s blood after one, two, three and four days  

To Find : How much of the drug remains active at the end of the first day?

6 mg.

12 mg.

26 mg.

32 mg.

At the end of each day which of the following is the approximate percentage of the previous day’s drug that remains active?

50%

80%

20%

40%

Solution:

x - axis represents  number of days

y - axis  represents  amount that remains active in Peter’s blood

From Graph against 1 on x axis   is 32

Hence  drug remains active at the end of the first day  =32 mg

Start of day    End of Day     %

80                     32                 (32/80)* 100  = 40%

32                     12                   (12/32)*100 =   37,5 %

12                      6                    (6/12) * 100  = 50%

Approx. 40%  is correct option

drug remains active at the end of the first day  =32 mg

approximate percentage of the previous day’s drug that remains active 40%