## What are Simultaneous Equations

You are already familiar with exponential equations. Exponential equations are used to model exponential growth and exponential decay. Exponential functions are the inverse functions of log functions.  In this article, we will see what are simultaneous exponential equations. We will also learn to simultaneous exponential equations from some examples. So, let us first see what are simultaneous equations:

"Simultaneous equations have two or more unknown variables with a common value in each equation".

Simultaneous exponential equations are also known as a system of exponential equations. The word simultaneous implies that these equations are solved together. The values of unknown variables in one equation also satisfy the values for unknowns in the second equation. It means that the variables in one equation do not have a unique solution.

Before proceeding to simultaneous exponential equations, it is expected of you that you already know how to solve the system of linear equations. We know that in exponential equations, the independent variable is an exponent, i.e. . In simultaneous exponential equations, the unknown variables are given in the exponent or power of the equations.

## Strategies to Solve System of Exponential Equations

There are certain strategies to solve the system of exponential equations. These strategies are described below:

• Using a combination of methods like solving the system of linear equations and laws of exponents
• Solving the system as you solve a typical system of linear equations by elimination, substitution or comparison method

One should use the strategy according to the requirement of the equations. Remember that you can solve the system of exponential equations only if the bases of two or more exponential equations are the same. If the bases are the same, the exponential system of equations is solved simply by setting exponents on left and right hand side of the equations equal to each other.

However, there can be a situation where you are asked to solve the system of exponential equations with different bases. In this scenario, you should see if you can set the same bases for both the equations by applying the exponent rules.

## Examples

Let us solve the system of exponential equations in the following examples to clarify this topic further.

### Example 1

Solve the system of exponential equations

### Solution

You can write the second equation as a cube of 3 on both the sides because 27 is equal to .

Multiplying the constant with terms inside the parenthesis will give us the following expression:

Hence, the system of exponential equations will be written as:

Since, the equations have same bases on the left and right side of the equations, so we can solve the exponents of this system by making them system of linear equations like this:

We can solve this system by substitution method. We already have in the first equation, so we will substitute this value of in the second equation like this:

Solve the expression inside the parentheses on the left hand side of the equation:

Subtract from both sides of the equation:

Subtract 6 from both sides of the equation to get the following expression:

Divide both sides by 3 to get the value of

Hence, we have obtained the value of . Now, calculating the value has become easier because we can directly substitute into the first equation to get the value of :

Hence, the solution of the above system of exponential equations is  and . This solution set can be written as .

### Verification

This step is not mandatory, however you can use this step to verify that your answer is true. Substitute and in the following system of exponential equations:

Hence, this shows that our solution is correct.

### Example 2

Solve the following simultaneous exponential equations.

### Solution

We can rewrite the second equation using the exponent product rule which says that product of two exponents with same base can be written as a single base with exponents added together and vice versa.

Suppose and . The expression will be written like this:

We can solve the above system of linear equations by elimination. Multiply the first equation by 2 to get the following expression:

We will cancel from the above system and the resultant expression will be:

Multiply both sides by to get .

Put this value of n in the first equation to get the following value for :

Subtract 9 from both the sides to get

Now, we know the values of and . In the beginning we made the following assumptions about these two values:

and

and

Since, raised to the power is equal to , i.e. , so . Similarly, raised to a power 2 is equal to , i.e. so, .

Hence, the solution set of the system of exponential equations is .

### Verification

We can verify our solution by putting the values of and variables into the system of exponential equations like  this:

Hence, it is verified that our solution is correct.

### Example 3

Solve the following system of exponential equations:

### Solution

We can rewrite the first and second equations like this:

Write the exponents of the above system of exponential equations as system of linear equations like this:

We can solve this system either by substitution or by elimination of variables. It is better to use elimination method because both the equations have which can be eliminated smoothly:

The resultant equation after elimination will be:

Multiply both sides of the above equation by -2 to make the variable positive:

Now, substitute this value of in the second linear equation to get the value of .

Add 2 to both the sides of the equation to get:

Divide both sides by 2 to get the value of :

Hence, the value of and satisfy the system of exponential equations. Or in other words, we can say that is the solution set of the original system of exponential equations.

### Verification

Let us verify our solution set by plugging in the values of and in the system of exponential equations like this:

Hence, it is verified that   is the solution set of the system of exponential equations.

### Example 4

Solve the following system of exponential equations:

### Solution

We can write the first and second equations like this:

Write the exponents of the above system of exponential equations as system of linear equations like this:

We can solve the above system of linear equation either by substitution or by elimination. Let us solve the system through substitution method. Substitute into to get the following value of :

Solve the algebraic expression by multiplying 3 with ther term inside the parenthesis:

Subtract from both the sides of the equation:

Add 18 to both sides of the equation to get the final value of :

Divide both sides by to get

Now, plug this value of in the first equation

Hence, the value of and the value of . In other words, we can say that the solution set of the system of exponential equation is .

### Verification

Now, we will verify our solution by plugging in the values of and in the original system of exponential equation:

Hence, our solution set is true for the given system of exponential equations.

### Example 5

Solve the following system of exponential equations.

### Solution

We can rewrite the second equation using the exponent product rule which says that product of two exponents with the same bases can be written as a single base with exponents added together and vice versa.

Suppose and . Hence, the resultant system of exponential equations will be:

Apply the negative exponent rule to further simplify the above system of exponential equations. According to the negative exponent rule, the negative exponent in the numerator becomes positive in the denominator and vice versa.

Multiply the second equation by 2 to get the following expression:

The first equation can be written as . Substitute this value of in the equation:

Subtract 7 from both sides of the equation to get:

Divide both sides of the equation by 3 to get the value of :

Substitute this value of in the first linear equation to yield the value of :

Add 25 to both sides of the equation:

Now, we have got the values of and . Remember in the beginning of the problem, we made the following assumptions about these two values:

and

Putting the values of and one by one in the equations will give us the values of and :

We know that , so .

We know that raised to a power 2 is equal to , so the value of . Hence, the solution set of the above system of exponential equation is .

### Verification

Let us verify our solution by putting the values of the variables in the original system of exponential equations.

Hence, it is proved that our solution set is correct for the above system of exponential equations. Remember that you do not need to follow the verification step. This step is used only when you want to be confident that your solution set is true for the given system of exponential equations.

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I am passionate about travelling and currently live and work in Paris. I like to spend my time reading, gardening, running, learning languages and exploring new places.

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