Integrating 2x: Why Doesn't it Work?

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The discussion centers on the misunderstanding of integration when attempting to find the area under the curve of the function y = 2x. The original approach incorrectly substitutes y = 2x into the integral without accounting for the necessary differential elements, dx or dy. It is emphasized that integration must be performed with respect to the correct variable, as the relationship between x and y involves derivatives that must be considered. The correct area can be calculated using standard integration techniques, confirming that the area under the curve from x = 0 to x = 2 is indeed 4. The key takeaway is that proper integration requires careful attention to the variables involved and their differentials.
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Ok, I was thinking today during my calculus class about taking the integral of a function in a different way. Let's assume for a second that we want to find the area between the function and the y axis, on the interval x = [0, 2] of the function y = 2x.

What I was thinking I could do, is take the integral of y.

(y^2)/2 then substitute 2x in for y, since y = 2x.

(2x)^2 / 2

That would give us the integral between the function and the y-axis and we would be able to put in the interval for x.

But it didn't work... I got the wrong answer? Why doesn't this work? I think it should work.

Thanks.
 
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Originally posted by DavidWi
Ok, I was thinking today during my calculus class about taking the integral of a function in a different way. Let's assume for a second that we want to find the area between the function and the y axis, on the interval x = [0, 2] of the function y = 2x.

What I was thinking I could do, is take the integral of y.

(y^2)/2 then substitute 2x in for y, since y = 2x.

(2x)^2 / 2

That would give us the integral between the function and the y-axis and we would be able to put in the interval for x.

But it didn't work... I got the wrong answer? Why doesn't this work? I think it should work.

Thanks.
Because that isn't how integration works?

Imagine doing the same for differentiation.

we want to find d/dx of x^2, well, d/dy of y is 1, so putting y=x^2, we get d/dx(x^2)=1It just isn't right.

More formally remember integration is wrt something

so integral of ydy is not the same as integral of x^2dx when you put x^2=y because the dy and dx are there, and if y=x^2, then dy is not dx - it is 2xdx
 
y=2x and x ranges between 0 and 2.

Of course, that's simply a right triangle with base (x-axis) of length 2 and height (y-axis) of length 4: its area is (1/2)(2)(4)= 4.

You could do this as \int_0^2(ydx)= \int_0^2(2x)dx= x^2\|_0^2= 4

You could do this as \int_0^4(xdy)= \int_0^4\frac{y}{2}dy= \frac{y^2}{4}\|_0^4= \frac{16}{4}= 4

Your formula is wrong because you never took into account the "dx" or "dy".
 

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