Exponential functions can model the rate of change of many situations, including population growth, radioactive decay, bacterial growth, compound interest, and much more. Follow these steps to write an exponential equation if you know the rate at which the function is growing or decaying, and the initial value of the group.
Steps
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Consider an example. Suppose a bank account is started with a $1,000 deposit and the interest rate is 3% compounded annually. Find an exponential equation modeling this function. [1] X Research source
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Know the basic form. The form for an exponential equation is f(t)=P 0 (1+r) t/h where P 0 is the initial value, t is the time variable, r is the rate and h is the number needed to ensure the units of t match up with the rate. [2] X Research sourceAdvertisement
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Plug in the initial value for P and the rate for r. You will have f(t)=1,000(1.03) t/h . [3] X Research source
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Find h. Think about your equation. Every year, the money increases by 3%, so every 12 months the money increases by 3%. Since you need to give t in months, you have to divide t by 12, so h=12. Your equation is f(t)=1,000(1.03) t/12 . [4] X Research source If the units are the same for the rate and the t increments, h is always 1.
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Consider an example. Suppose a 500 gram sample of an isotope of Carbon has a half life of 50 years (the half life is the amount of time for the material to decay by 50%).
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Know the basic form. The form for an exponential equation is f(t)=ae kt where a is the initial value, e is the base, k is the continuous growth rate, and t is the time variable.
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Plug in the initial value. The only value you are given that you need in the equation is the initial growth rate. So, plug it in for a to get f(t)=500e kt
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Find the continuous growth rate. The continuous growth rate is how fast the graph is changing at a particular instant. You know that in 50 years, the sample will decay to 250 grams. That can be considered a point on the graph that you can plug in. So t is 50. Plug it in to get f(50)=500e 50k . You also know that f(50)=250, so substitute 250 for f(50) on the left hand side to obtain the exponential equation 250=500e 50k . Now to solve the equation, first divide both sides by 500 to get: 1/2=e 50k . Then take the natural logarithm of both sides to get: ln(1/2)=ln(e 50k . Use the properties of logarithms to take the exponent out of the argument of the natural log and multiply it by the log. This results in ln(1/2)=50k(ln(e)). Recall that ln is the same thing as log e and that the properties of logarithms say that if the base and the argument of the logarithm are the same, the value is 1. Therefore ln(e)=1. So the equation simplifies to ln(1/2)=50k, and if you divide by 50, you learn that k=(ln(1/2))/50. Use your calculator to find the decimal approximation of k to be approximately -.01386. Notice that this value is negative. If the continuous growth rate is negative, you have exponential decay, if it is positive, you have exponential growth.
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Plug in the k value. Your equation is 500e -.01386t .
Expert Q&A
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QuestionWhat are some great tips when solving for exponents?David Jia is an Academic Tutor and the Founder of LA Math Tutoring, a private tutoring company based in Los Angeles, California. With over 10 years of teaching experience, David works with students of all ages and grades in various subjects, as well as college admissions counseling and test preparation for the SAT, ACT, ISEE, and more. After attaining a perfect 800 math score and a 690 English score on the SAT, David was awarded the Dickinson Scholarship from the University of Miami, where he graduated with a Bachelor’s degree in Business Administration. Additionally, David has worked as an instructor for online videos for textbook companies such as Larson Texts, Big Ideas Learning, and Big Ideas Math.When solving exponents, remember to add the exponents together if you have the same base. For instance, x to the second power multiplied by x to the third power results in x to the fifth power. If dealing with a base that already has an exponent, multiply the exponents together; for example, (x to the second power) to the third power equals x to the sixth power. Negative exponents signify taking the reciprocal of the base, as x to the negative second power is the same as one over x to the positive second power. Understanding that exponents in the denominator are equivalent to roots is crucial. A square root is represented by x to the power of one over two, and a seventh root corresponds to an exponent of one-seventh. Recognize that roots and exponents are opposites, similar to addition and subtraction or multiplication and division. This comprehension is fundamental for effectively working with exponentials and roots.
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QuestionCan you help me solve this problem? "The median price P of a home rose from $100000 in 1990 to $350000 in 2010 let t be no. of years since 1990 find an equation of the form P=P0a^t"Community AnswerYou know that, when t=0, the price, P, is $100000. So, P0 must be 100000. Now use the second data point, when t=20. 350000=100000xa^20 (divide by 100000) 3.5 = a^20 (taking the 20th root) a=3.5^(1/20)=1.0646 which can be interpreted as an average increase of 6.46% per year.
Tips
- You might want to store your k value in your calculator so you can calculate your values more exactly than with a decimal approximation. X is an easily accessible variable to use since you don't need to press "alpha" to get to it, but if you want to graph the equation, be sure to use a variable designated as a constant or you'll put in extra variables.Thanks
- You will quickly learn when to use each method. Usually, problems are easier using the first method, but there are times when you know using the natural base will make your calculations easier later.Thanks
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References
- ↑ https://www.cuemath.com/exponential-growth-formula/
- ↑ https://www.cuemath.com/exponential-growth-formula/
- ↑ https://www.cuemath.com/exponential-growth-formula/
- ↑ https://www.cuemath.com/exponential-growth-formula/
- ↑ https://www.mathsisfun.com/numbers/e-eulers-number.html
- ↑ https://www.purplemath.com/modules/expofcns5.htm
About This Article
To write an exponential function given a rate and an initial value, start by determining the initial value and the rate of interest. For example if a bank account was opened with $1000 at an annual interest rate of 3%, the initial value is 1000 and the rate is .03. Then, rewrite the time variable of t/h as t/12, since the money increases by 3% every 12 months. Finally, plug in the values and write your exponential function as f(t)=1,000(1.03)t/12. To learn more, including how to find the continuous growth rate from an exponential function, scroll down.