Kulla_9289
Junior Member
- Joined
- Apr 18, 2022
- Messages
- 223
So, [imath]2^x*2^2=2^3*5[/imath]? We still can't solve for [imath]x[/imath].
We're not trying to solve for x algebraically but to use the graph of [imath]2^x[/imath]. Think again.So, [imath]2^x*2^2=2^3*5[/imath]? We still can't solve for [imath]x[/imath].
If you have to ask that question, it means you haven't fully understood what we've been doing. You have a record of 4 pages of posts and walked through 3 different problems. The answers are embedded in there and repeated many times. Can you look at them again, and go through the steps? Try to understand why you did what we did, and just not blindly solve equations.What is the concept for this, and what are we trying to achieve?
You said at one point that you are learning about:No examples have been provided by the instructor, and I haven’t learnt transformation of graphs yet.
That means you've been taught something about the sort of problems you are asking for help with.Finding solutions graphically
@BigBeachBanana according to @Dr.Peterson, this problem is a little bit different and won’t work if I use the concept I HAVE LEARNED through the other examples.If you have to ask that question, it means you haven't fully understood what we've been doing. You have a record of 4 pages of posts and walked through 3 different problems. The answers are embedded in there and repeated many times. Can you look at them again, and go through the steps? Try to understand why you did what we did, and just not blindly solve equations.
As per the guideline, share your thoughts on the answer to that question, after that we can correct you if needed.
The textbook I have tells me that I have manipulate the equation until one side matches with the other one. For some reason, the method Steven and you have provided is more thorough for the other problems; I feel more confident using this.You said at one point that you are learning about:
That means you've been taught something about the sort of problems you are asking for help with.
I want to see what is being taught about that, which I would think would include an example. There probably isn't an example just like the current problem, but there must be something you can show to illustrate what sort of approaches they are taking. If I knew that, I would be in a better position to relate this problem to what you have learned.
It's not clear what that means, exactly. Can you show us exactly what it says?The textbook I have tells me that I have manipulate the equation until one side matches with the other one. For some reason, the method Steven and you have provided is more thorough for the other problems; I feel more confident using this.
Yes, that is the simplest approach I can see. What is your answer?Since y = 2^x and 2^x = 10, I need to intersect y = 2^x with y = 10.
I've shown you two methods, I believe (left for you to carry out).@Dr.Peterson could you show all the methods to solving this exponential function? Transformation of graphs is in my syllabus and will learn it soon.
Presumably the author thinks that the (general) concept that has been taught should be enough. We want to help you learn to apply such general concepts to novel situations, which is what genuine learning has to include. This is why we have asked you to try. And you have, I think, succeeded.@BigBeachBanana according to @Dr.Peterson, this problem is a little bit different and won’t work if I use the concept I HAVE LEARNED through the other examples.
Could you show the method of transformation of graphs?Another is to use the graph to find x+2, and then solve that for x.
I can, but I don't understand the reasoning behind it as I do with the method Steven and you propounded. Here it is:It's not clear what that means, exactly. Can you show us exactly what it says?
After intersecting, (3.3, 10). So, x ≈ 3.3. Which one is the answer?Yes, that is the simplest approach I can see. What is your answer?
We're talking about this problem, right? (Long threads and page boundaries tend to hide things.)After intersecting, (3.3, 10). So, x ≈ 3.3. Which one is the answer?
@Dr.Peterson How would I solve 2^(x+2) = 40 if I am given a graph of y = 2^x?
Yes, the answer is (approximately) x = 3.3. Checking it, we get 2^(3.3+2) = 2^5.3 = 39.397 ≈ 40.So, [imath]2^x=40/2^2[/imath], which is [imath]2^x=10[/imath].
Clearly this part of one example isn't all the book says about the topic (I was hoping for a general explanation of the procedure); but let's talk about it:I can [show exactly what it says], but I don't understand the reasoning behind it as I do with the method Steven and you propounded. Here it is:
This is an easy one. Do it like the example you showed from the book, or like the first one we did. Don't worry about the exponential function; just compare what you have, [imath]y=2(0.5)^x-1[/imath] to what you want, [imath]2(0.5)^2+2x-3.5[/imath]. Rearrange the latter to have the former on one side.@Dr.Peterson How would I solve [imath]2*0.5^x+2x-3.5=0[/imath] if I were a given a graph of [imath]y=2*0.5^x-1[/imath]? To be honest, I am actually confused on the standard form of an exponential function. I can't use the laws of indices here.
No, no, no. That doesn't help at all.@Dr.Peterson So, [imath]ax+b=2*0.5^x-1[/imath]. [imath](ax+b)/0.5^x=2/0.5^x-1/0.5^x[/imath]
Please show your WORK, by whatever method. It may well be exactly what I chose to do for this one.@Dr.Peterson I know the answer (y=-2x+2.5) using the method of the book. I want to solve it using your method; give me a hint.
Show me your ideas.@Dr.Peterson Is it possible to solve these types of questions by means of substitution?
Please show your attempts to use each method on the problem you say you can't. Too much has been said in this thread to be sure which problems and which methods you are talking about.I am looking for a way to solve these types of questions. We can't use the first method we learnt to solve exponential functions, and we can't use the method of the book. Is there only one method to stick to?