Friday, September 6, 2019
Solving proportions Essay Example for Free
Solving proportions Essay Proportions exist in many real-world applications, and in this problemà estimating the size of the bear population on the Keweenaw Peninsula. By comparingà data from two experiments, conservationists are able to predict patterns of animalà increase or decrease. In this situation, 50 bears were captured and tagged and released toà estimate the size of the bear population. A year later, after capturing a random sample ofà 100 bears only 2 of the bears captured were tagged bears. These proportions will be usedà to determine the bear population on the peninsula. This new bear scenario can be solvedà by applying the concept of proportions which allows the assumption of theà ratio ofà originally tagged bears to the whole population is equal to the ratio of recaptured taggedà bears to the size of the sample. To determine the estimated solution, the bears will be theà extraneous variables that will be defined for solving the proportions used. The ratio of originally tagged bears to the whole population X_2_The ratio of recaptured tagged bears to the sample size 10050 = _2_ This is the proportion set up and ready to solve. X 100à (50)(100), (X)(2)The next step is to cross multiply.à 5000 = 2X Divide both sides by 2 2 2à 2500 = XThe bear population on the Keweenaw Peninsula is estimated to beà around 2500. The extreme means for this sample were 50 and 100, X and 2.à For the second problem in this assignment, the equation must be solved for Y.à Continuing the discussion of proportions, a single fraction (ratio) exists on both sidesà of the equal sign so basically it is a proportion, which can be solved byà crossà multiplying the extremes and means. Y-1 = 3 Original equation solving for Yà X+3 4à 4(Y-1) = -3(X+3) Cross multiply both sidesà 4Y-4 = -3X-9 Add 4 to both sidesà 4Y = -3X-5 Divide both sides by 4à Y = -3X-5 Final answer for Yà 4 4à This is a linear equation in the form of y = mx + b. After comparing the solutionà to the original problem, it is noticed that the slope, -3/4 ,is the same number on the rightà side of the equation. This indicates that another method exists for solving the sameequation.à Y-1 = 3 Original equation solving for Yà X+3 4à Y-1 = -3(X+3) Multiply both sides by (X+3)à 4à Y-1 = -3X-9 Add 1 to both sidesà 4 4à Y = -3X-5 Final answerà 4 4 After solving both of these problems I found it interesting how 2 totally differentà equations could be solved with the same basic functions. I also found that everyday lifeà can incorporate these math functions to solve or estimate daily life events for a number ofà different reasons.. REFERENCES References: Elementary and Intermediate Algebra, 4th Ed., Dugopolski
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