I managed to find how to do it by switching x and y and i ended up getting y=(sqroot of x+9) +2, but instead i used the completing the square method. But even with yours, the next question says gives two restrictions to the domain that makes the inverse a function? For it to be a function you can do the vertical line test, but i couldnt think of anything that would change the domain but only that could change the range to make it a function? Even if yours is correct, what could be the possible domain restrictions. Thanks for your help.This is what I got
Ok, that makes sense. I managed to somehow (previsouly in holidays) to get the same restrictions. However, when i did the inverse i managed to get y= sqroot (x+9) +2. is this correct? I used the completing the square method. Or do you have to find the inverse for each restricted function?
Thanks mate. The explanation helped so much!
Sweet, thats all good now. Can you help me with the reply (qoute) above?
 \;$and$\; e)\;$For the domain$\; (-\infty , -2]\; $we have$\; f^{-1}(x) = -\sqrt{x+9}-2 \;$and for the domain$\; [-2, \infty )\; $we have$\; f^{-1}(x) = \sqrt{x+9}-2 )
So for b) (the inverse) i got (x+4)/3 which as far as im aware is the same as 1/3(x+4). I can remember seeing that |f^-1(x)| around in a topic but can remember its effect or what it means. If i graph both on my CAS there the same.Also I don't recall inverse function topic to be in 2U...
For question c) you have
Graph that!
What is the effect of having?
Well then what does it equal. If |f^-1(x)| is only going to contain a positive value and x = either (x+4)/3 or 1/3(x+4)? And how do i know which one is correct (x+4)/3 or 1/3(x+4)? Totally confused now. But i do remeber absoolute value and the y=|x|. Even if x is a ngeative value, in |x| it is always positive.They are in fact NOT the same!
