One should use the strategy according to the requirement of the equations. Solving the system as you solve a typical system of linear equations by elimination, substitution or comparison method.Using a combination of methods like solving the system of linear equations and laws of exponents.There are certain strategies to solve the system of exponential equations. Let's go Strategies to Solve System of Exponential Equations In simultaneous exponential equations, the unknown variables are given in the exponent or power of the equations. We know that in exponential equations, the independent variable is an exponent, i.e.
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It means that the variables in one equation do not have a unique solution.īefore proceeding to simultaneous exponential equations, it is expected of you that you already know how to solve the system of linear equations. The values of unknown variables in one equation also satisfy the values for unknowns in the second equation. The word simultaneous implies that these equations are solved together. Simultaneous exponential equations are also known as a system of exponential equations. "Simultaneous equations have two or more unknown variables with a common value in each equation". So, let us first see what are simultaneous equations: We will also learn to simultaneous exponential equations from some examples. In this article, we will see what are simultaneous exponential equations. Exponential functions are the inverse functions of log functions. Exponential equations are used to model exponential growth and exponential decay. You are already familiar with exponential equations.