Inverse of a Function. I have different ways of choosing problems to solve on this blog. Sometimes I go through books and notes I have. Other times, I use Google. π This week, Google won as my method due to a lack of time. π€·πΏ♀️ What can I say? So, I decided to check out some precal topics and found a lighter problem to use.
To solve this week's problem in completion, you need to recall the following math skills:
✔️ How to find the inverse of a function
That's it? Yup...that's it. WMP! #34 wants us to...
Happy solving!
Check back on Friday, January 22nd for the solution, which will be posted below ⬇️.
Shameless π Plug: Follow me on Instagram @TheYoungeLady
Buy Me a ☕️ Coffee: TheYoungeLady ( I'm gonna need it this year. π )
✏️π Solution Time! π✏️
⬇️
⬇️
⬇️
⬇️
⬇️
Let's go right on ahead and jump in this thing!
Here comes the fun π€ͺ part! (At least I think it's fun. π€·πΏ ) The equation right above here is a literal equation. We are going to solve it but, the answer we get will not be a number. By placing x over 1, it can be more clearly seen that the above equation is a proportion.
We're just about done. Just one more thing...a mere formality:
That's it! We've found the inverse function, f -1. π€ΈπΏ♀️ Yay! Like the original function, the inverse is also a rational function, with a variable present in the denominator. That means we cannot use, or plug-in, any value for x that we like. To continue with the second part of the question, we will find the domain for f -1 by identifying which value of x will cause the function to be undefined. I did something slightly unconventional to find the value. Instead of setting the denominator equal to zero, I set the denominator not equal zero and proceeded normally:
Now, I can write the domain formally. I don't really have a preference for notation, so I did it two ways:
You know I wouldn't end this blog post without graphing the functions, right? Okay, great! (I tried something a little different with the color scheme. What do you think?) When a function and its inverse are plotted on the same set of axes, they will be mirror images of each other. The mirror is the line y = x.
▪️ Let me know what you thought about this week's problem down below.
Thanks for solving with me this week!
Up next...WMP! #35
☞
Cheers!
The Younge Lady
No comments:
Post a Comment