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# GEOMETRIC SERIES IN MEDICINE

Geometric series and effective medicine dosage.Introduction.This lab concerns a model for a drug being given to a patient at regular intervals. As the drug is broken down by the body,its concentration in the bloodstream decreases. However,it doesn't disappear completely before the next dose is given.
Geometric series and effective medicine dosage
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Geometric series and effective medicine dosage
Geometric series and effective medicine dosage. Introduction This lab concerns a model for a drug being given to a patient at regular intervals. As the drug is broken down by the body, its concentration in the bloodstream decreases. However, it doesn't disappear completely before the next dose is given.
Applications of Exponential Decay and Geometric Series in
Geometric series [1][2][3][4][5][6][7][8][9][10] played a vital role in differential and integral calculus at the earlier stage of development and still continues as an important part of the study
Applications of exponential decay and geometric series in
Thus, this paper discusses the effective medicine dosage and its concentration in bloodstream of a patient. For analysis of dose concentration and mathematical mo- delling of minimum and maximum concentration of a drug administered intravenously, the EDM (Exponential Decay Model) and GSF (Geometric Series and its Formula) are the powerful mathematical tools.Author: Chinnaraji AnnamalaiPublish Year: 2010
Math Lesson: Take your Medicine - pulsemacyona
A geometric series is a series in which each consecutive term is a multiple of the one before. If the first term of the series is a and the constant multiplier, or common ratio of successive terms is r, then a finite geometric series with n terms has the form: Notice that the exponent of the last term is (n-1).
Geometric Series - Varsity Tutors
Finite Geometric Series. To find the sum of a finite geometric series, use the formula, Sn=a1(1−rn) 1−r,r≠1 , where n is the number of terms, a1 is the first term and r is the common ratio .
Geometric series - definition of geometric series by The
geometric series - a geometric progression written as a sum. series - (mathematics) the sum of a finite or infinite sequence of expressions.
Convergent & divergent geometric series (with manipulation
Infinite geometric series is if the absolute value of your common ratio is greater than zero and less than one. So we just have to think about, what is the absolute value of the common ratios over here? And it's not as obvious, because they didn't just write one term or one number to an exponent. They wrote several numbers to an exponents.
Geometric series intro (video) | Series | Khan Academy
So a geometric series, let's say it starts at 1, and then our common ratio is 1/2. So the common ratio is the number that we keep multiplying by. So 1 times 1/2 is 1/2, 1/2 times 1/2 is 1/4, 1/4 times 1/2 is 1/8, and we can keep going on and on and on forever.
Math Lesson: Take your Medicine 2 - pulsemacyona
Teacher Background. The formula for the sum of the first n terms of a finite geometric series is: where a is the first term of the series, r is the common ratio between consecutive terms, and n is the number of terms in the series.
Geometric series - Wikipedia
In mathematics, a geometric series is a series with a constant ratio between successive terms. For example, the series + + + + ⋯ is geometric, because each successive term can be obtained by multiplying the previous term by 1/2.
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