Select The Correct Answer.What Is The Solution To This Equation?$8e^{2x+1}=4$A. $x=\frac{\ln (0.5)}{2}-1$ B. $x=\frac{\ln (0.5)-1}{2}$ C. $x=\frac{\ln (0.5)}{2}+1$ D. $x=\frac{\ln (0.5)+1}{2}$
Introduction
Exponential equations are a fundamental concept in mathematics, and solving them requires a deep understanding of algebraic manipulation and logarithmic properties. In this article, we will focus on solving the equation and provide a step-by-step guide on how to arrive at the correct solution.
Understanding Exponential Equations
Exponential equations involve the variable in the exponent, and the base is typically a constant. In this case, the base is , which is a mathematical constant approximately equal to 2.71828. The equation can be rewritten as , which simplifies to .
Step 1: Isolate the Exponential Term
To solve the equation, we need to isolate the exponential term. We can start by dividing both sides of the equation by , which gives us:
This simplifies to:
However, this is not a valid equation, as the left-hand side is always equal to 1. We need to revisit our previous step and try a different approach.
Step 2: Use Logarithms to Solve the Equation
One way to solve the equation is to use logarithms. We can take the natural logarithm (ln) of both sides of the equation, which gives us:
Using the property of logarithms that states , we can simplify the left-hand side of the equation:
Since , we can simplify the equation further:
Step 3: Solve for x
Now that we have isolated the variable , we can solve for it. We can start by subtracting 1 from both sides of the equation:
Next, we can divide both sides of the equation by 2:
Conclusion
In this article, we have solved the equation using logarithms. We have shown that the correct solution is . This solution is valid because it satisfies the original equation.
Comparison with Other Options
Let's compare our solution with the other options:
- Option A:
- Option B:
- Option C:
- Option D:
Our solution is different from all of these options. Option A is incorrect because it does not account for the negative sign in the exponent. Option B is incorrect because it does not account for the subtraction of 1 from the logarithm. Option C is incorrect because it adds 1 to the logarithm, rather than subtracting it. Option D is incorrect because it adds 1 to the logarithm, rather than subtracting it.
Final Answer
The correct solution to the equation is:
This solution is valid because it satisfies the original equation.
Additional Tips and Tricks
When solving exponential equations, it's essential to use logarithms to isolate the variable. This can help you avoid making mistakes and ensure that your solution is correct. Additionally, make sure to check your work by plugging your solution back into the original equation. This will help you verify that your solution is indeed correct.
Common Mistakes to Avoid
When solving exponential equations, there are several common mistakes to avoid:
- Not using logarithms to isolate the variable
- Not accounting for the negative sign in the exponent
- Not subtracting 1 from the logarithm
- Not adding 1 to the logarithm
- Not checking your work by plugging your solution back into the original equation
By avoiding these common mistakes, you can ensure that your solution is correct and accurate.
Conclusion
Frequently Asked Questions
Q: What is an exponential equation?
A: An exponential equation is an equation that involves a variable in the exponent. It is typically written in the form , where is a constant and is the variable.
Q: How do I solve an exponential equation?
A: To solve an exponential equation, you can use logarithms to isolate the variable. This involves taking the logarithm of both sides of the equation and using the properties of logarithms to simplify the equation.
Q: What is the difference between a logarithmic equation and an exponential equation?
A: A logarithmic equation is an equation that involves a variable in the logarithm, whereas an exponential equation involves a variable in the exponent. For example, the equation is a logarithmic equation, whereas the equation is an exponential equation.
Q: How do I choose between using natural logarithms and common logarithms?
A: Natural logarithms (ln) and common logarithms (log) are both used to solve exponential equations. Natural logarithms are typically used when the base of the exponential is , whereas common logarithms are typically used when the base is 10.
Q: What is the property of logarithms that states ?
A: This property states that the logarithm of a power is equal to the exponent multiplied by the logarithm of the base. For example, .
Q: How do I use the property of logarithms to simplify an exponential equation?
A: To simplify an exponential equation using the property of logarithms, you can take the logarithm of both sides of the equation and use the property to rewrite the equation in a simpler form.
Q: What is the difference between and ?
A: represents the natural logarithm of , whereas represents the common logarithm of . The natural logarithm is typically used when the base is , whereas the common logarithm is typically used when the base is 10.
Q: How do I solve an exponential equation with a negative exponent?
A: To solve an exponential equation with a negative exponent, you can use the property of logarithms that states . This involves taking the logarithm of both sides of the equation and using the property to rewrite the equation in a simpler form.
Q: What is the final answer to the equation ?
A: The final answer to the equation is .
Q: How do I check my work when solving an exponential equation?
A: To check your work when solving an exponential equation, you can plug your solution back into the original equation and verify that it is true. This will help you ensure that your solution is correct and accurate.
Q: What are some common mistakes to avoid when solving exponential equations?
A: Some common mistakes to avoid when solving exponential equations include:
- Not using logarithms to isolate the variable
- Not accounting for the negative sign in the exponent
- Not subtracting 1 from the logarithm
- Not adding 1 to the logarithm
- Not checking your work by plugging your solution back into the original equation
By avoiding these common mistakes, you can ensure that your solution is correct and accurate.