Solving Exponential Equations | Summary and Q&A
TL;DR
This content explains how to solve exponential equations without using logarithms and provides examples for finding the value of x.
Key Insights
- ⚾ Changing the base of an exponential equation can simplify the equation and make it easier to solve.
- 🖐️ Exponent properties, such as multiplying exponents when the bases are the same, play a crucial role in manipulating exponential equations.
- 😒 For equations involving base e, it is recommended to use the natural logarithm for solving.
- ❓ Factoring and substitution can be used to solve exponential equations that cannot be simplified using logarithms.
Transcript
consider the following exponential equation three raised to the x plus two is equal to nine raised to the two x minus three how can we find the value of x without using logs what you need to do is change base nine into base three three squared is equal to nine so we can replace nine with three squared and whenever you raise one exponent to another ... Read More
Questions & Answers
Q: How can we solve exponential equations without using logarithms?
To solve exponential equations without logarithms, we can change the base of the equation by using exponent properties and then simplify to find the value of x.
Q: In the example where 3^x = 8, how do we find the value of x?
To find the value of x in the equation 3^x = 8, we can take the logarithm of both sides. By evaluating log 8 / log 3, we get x ≈ 1.8928.
Q: What is the value of x in the equation e^x = 7?
In equations involving base e, we can use the natural logarithm. By taking the natural logarithm of both sides, we get x = ln 7 ≈ 1.9459 as the exact answer.
Q: How do we solve the equation 5 + 4^(x-2) = 23 to find x?
To find the value of x in the equation 5 + 4^(x-2) = 23, we subtract both sides by 5, then apply logarithmic operations to isolate x. The exact answer is x = 2 + log18/log4 ≈ 2.08496.
Summary & Key Takeaways
-
The content demonstrates how to solve exponential equations by changing the base and applying exponent properties.
-
It provides step-by-step explanations for solving three different examples of exponential equations.
-
The content also covers solving equations involving base e and applying logarithmic operations.