Solving Definite Integral Problem: ∫3,6(2f(x)−3)dx=12

In summary, the problem is to find the value of an integral where the function is unknown and unknowable.
  • #1
lab-rat
44
0
We are just starting integrals right now and I'm having trouble with this problem. I know how to solve a definite integral but I don't quite understand what is being asked here? Just wondering if anyone could let me know where I should start?

if∫0,3f(x)dx=12, ∫0,6f(x)dx=42,find ∫3,6(2f(x)−3)dx=12.
 
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  • #2
lab-rat said:
We are just starting integrals right now and I'm having trouble with this problem. I know how to solve a definite integral but I don't quite understand what is being asked here? Just wondering if anyone could let me know where I should start?

if∫0,3f(x)dx=12, ∫0,6f(x)dx=42,find ∫3,6(2f(x)−3)dx=12.
This is a little difficult to read. I think this is what you're being asked:
[tex]\int_0^3 f(x)dx = 12[/tex]
[tex]\int_0^6 f(x)dx = 42[/tex]
[tex]\text{Find }\int_3^6 (2f(x) - 3)dx = 12[/tex]

I used LaTeX to format what you wrote, but I don't think the last equation is correct. I believe it should be
[tex]\text{Find }\int_3^6 (2f(x) - 3)dx[/tex]

Your book should have some theorems about definite integrals. That's where you need to be looking.
 
  • #3
The thing is, it that last equation is correct. It is =12. Which is why it doesn't make sense to me.
 
  • #4
Have you calculated the value of the integral?
 
  • #5
Two things:
1) Given the first two equations, the value of the integral in the third equation couldn't be 12. I get a significantly larger number.
2) The wording of the problem is weird, especially the word "find". It would make sense to find the value of the integral, or to show that the integral's value was some particular number. As used in this problem, it is like saying find x = 2. What is the exact wording of this problem? Are you translating from some other language?
 
  • #6
The function isn't given so I'm not quite sure how to do this. We've only learned how to calculate area beneath the curve with simple geometry and to use the Riemann sum.
 
  • #7
Mark44 - I copy and pasted the actual question. However, my prof is chinese so maybe that's why the question seems confusing? I really don't understand what he wants me to find...
 
  • #8
See the end of post #2.
Your book should have some theorems about definite integrals. That's where you need to be looking.
 
  • #9
We don't have a textbook for this class.
 
  • #10
lab-rat said:
if∫0,3f(x)dx=12, ∫0,6f(x)dx=42,find ∫3,6(2f(x)−3)dx=12.

If this is your problem word for word, then you need to get confirmation on what the problem is. Like Mark said, the conclusion to this "problem" is false. I'm guessing the problem is to find [itex]\int_{3}^6 (2f(x) - 3)dx[/itex], but nobody here will know unless you find out what the true problem statement is.
 
  • #11
That's probably what the question is and I'm assuming it was a typo. I will ask tomorrow for sure but in the mean time how would I solve if the question were indeed what gb7nash thinks?
I have looked through all of my notes and can't find anything to get me started...
 
  • #12
I also get a much larger number for an answer.

The first step is to recognise what the 2 integrals that are given, are given for. You are told that
[tex]\int^{6}_{0}f(x)dx=42[/tex]

And that
[tex]\int^{3}_{0}f(x)dx=12[/tex]

Now these are obviously going to be needed to solve the problem, try to find a way to use them.
 
  • #13
[itex]\int^{6}_{3}[/itex] f(x)dx = 42 - 12 = 30

Is this correct? If so I don't know how 2f(x)-3 will affect the integral without knowing what the actual function is... I must be missing something
 
  • #14
lab-rat said:
[itex]\int^{6}_{3}[/itex] f(x)dx = 42 - 12 = 30

Is this correct? If so I don't know how 2f(x)-3 will affect the integral without knowing what the actual function is... I must be missing something

Yes that is correct.

So now that you know
[tex]\int^6_3f(x)dx = 30 [/tex]
You have everything you need to integrate it.
 
  • #15
Bread18 said:
Yes that is correct.

So now that you know
[tex]\int^6_3f(x)dx = 30 [/tex]
You have everything you need to integrate it.
There is no integration that takes place, since the function is unknown and unknowable. This is a matter of substitution only.

The piece that the OP is missing is this:
[tex]\int_a^c f(x)~dx = \int_a^b f(x)~dx + \int_b^c f(x)~dx [/tex]

This is the theorem I was referring to back in post #2, but since the class is being presented without a textbook, that makes it harder to look up a theorem in the book.
 
  • #16
Mark44 said:
There is no integration that takes place, since the function is unknown and unknowable. This is a matter of substitution only.

The piece that the OP is missing is this:
[tex]\int_a^c f(x)~dx = \int_a^b f(x)~dx + \int_b^c f(x)~dx [/tex]

This is the theorem I was referring to back in post #2, but since the class is being presented without a textbook, that makes it harder to look up a theorem in the book.

You still have to integrate it, perhaps evaluate would have been a better word, but either way, he now was to integrate
[tex]\int^6_32f(x)-3dx[/tex]
 
  • #17
I wrote some notes about integration and posted them in the learning material section, they will help you solve your problem.
 
  • #18
Bread18 said:
You still have to integrate it, perhaps evaluate would have been a better word, but either way, he now was to integrate
[tex]\int^6_32f(x)-3dx[/tex]
Evaluate is a better word, and that will involve substitution (i.e., replacing specific integrals by their known values). Integration is not a part of this problem. How could it be, since f(x) is not known?
 
  • #19
Mark44 said:
Integration is not a part of this problem. How could it be, since f(x) is not known?

Well, technically it still is, just not on f(x). You still have to integrate 3.
 
  • #20
All right, well this is probably wrong but here is what I got!

I took out the 2, which I didn't I could do which is probably what confused me the most..
I'm having trouble with the symbols right now but I essentially put the 2 in front of the integral of the function and substracted the integral of 3. Which gave me 60-3x... Is that right??
 
  • #21
lab-rat said:
but I essentially put the 2 in front of the integral of the function and substracted the integral of 3.

That sounds right. So you rewrote your problem as [itex]2 \int_{3}^6 f(x)dx - \int_{3}^6 3 dx[/itex]?

lab-rat said:
Which gave me 60-3x... Is that right??

The first part is fine, but the bolded part doesn't make any sense. If you're working with a definite integral...
 
  • #22
Yes that is how I wrote it. How should I solve the second part? I've been looking everywhere... The only thing I could find was that it's supposed to be the anti derivative.. Well 3x is the antiderivative of 3 isn't it?
 
  • #23
lab-rat said:
Yes that is how I wrote it. How should I solve the second part? I've been looking everywhere... The only thing I could find was that it's supposed to be the anti derivative.. Well 3x is the antiderivative of 3 isn't it?

Yes, so substitute the upper bound into that expression to get a value. Then substitute the lower bound into that expression to get a value. Then take the first value minus second value, and that's the definite integral.

Remember [itex]\int_a^b f(x)dx = F(b) - F(a)[/itex], where F(x) is the antiderivative of f(x).
 

1. What is a definite integral?

A definite integral is a mathematical concept used to find the area under a curve between two specific points on a graph. It is represented by the symbol ∫ and is often used in calculus to solve problems involving rates of change and accumulation.

2. How do you solve a definite integral problem?

To solve a definite integral problem, you first need to identify the limits of integration (the two points that define the area under the curve). Then, you can apply the fundamental theorem of calculus, which states that the definite integral of a function can be found by evaluating its antiderivative at the upper and lower limits of integration and taking the difference between the two values.

3. What does the notation ∫3,6(2f(x)−3)dx=12 mean?

The notation ∫3,6(2f(x)−3)dx=12 represents a definite integral problem with the limits of integration set at x=3 and x=6. The function inside the integral (2f(x)-3) is being integrated with respect to x, and the result of the integral is equal to 12.

4. How do you solve for f(x) in a definite integral problem?

To solve for f(x) in a definite integral problem, you need to first solve the integral for the given limits of integration. Once you have the value of the integral, you can then solve the equation for f(x) by rearranging the terms and isolating f(x) on one side of the equation.

5. Can definite integrals be solved using numerical methods?

Yes, definite integrals can be solved using numerical methods such as the trapezoidal rule or Simpson's rule. These methods involve approximating the area under the curve by dividing it into smaller shapes (usually trapezoids or parabolas) and calculating their individual areas, then summing them up to get an approximate value for the integral.

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