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integration question (1 Viewer)
- Thread starter jojo321
- Start date
This problem cannot be done as it stands by 3 unit methods. However, it can be transformed to a valid 3u problem, in at least two ways:
Method One: Differentiate the function xln x, and then integtate the result to establish what int ln x dx is.
Method Two: Draw a diagram of y= 2ln x, and mark the points A(1, 0) - the x-intercept of y = 2ln x - B(e, 0),
C(e, 2) - which lies on the curve - and D(0, 2). The required area is ABC. However, the area OACD can be found by integration against the y-axis (O is the origin), and OBCD is a rectangle of area 2e. So, the required area is
ABC = 2e - area OACD.
Method Three (Extn 2 students only): Use integration by parts.
Method One: Differentiate the function xln x, and then integtate the result to establish what int ln x dx is.
Method Two: Draw a diagram of y= 2ln x, and mark the points A(1, 0) - the x-intercept of y = 2ln x - B(e, 0),
C(e, 2) - which lies on the curve - and D(0, 2). The required area is ABC. However, the area OACD can be found by integration against the y-axis (O is the origin), and OBCD is a rectangle of area 2e. So, the required area is
ABC = 2e - area OACD.
Method Three (Extn 2 students only): Use integration by parts.
Last edited:
SarahMary
*Procrastination Central*
since it is 3 unit you can also use the substitution method, you know let u=ln x, find du, and do it that way
freaking_out
Saddam's new life
well when u differentiate xlnx, u get an xlnx= lnx + 1
hence when u integrate lnx + 1, it should equal to xlnx...so work from there.
George W. Bush
Banned
i.e. xlnx = integral (lnx) + integral (1)
integral (lnx) = xlnx - integral (1)
= xlnx - x + c
and substitution doesn't work because you have no 1/x for du
integral (lnx) = xlnx - integral (1)
= xlnx - x + c
and substitution doesn't work because you have no 1/x for du
So, the full solution by method 1 would be:
d/dx (xln x) = ln x * d/dx(x) + x * d/dx(ln x), using the product rule
= ln x * 1 + x * 1 / x
= ln x + 1
Integrating both sides with respect to x, we get:
xln x = int ln x dx + int 1 dx
xln x = int ln x dx + x + C, for some constant C.
So, int ln x dx = xln x - x + C', where C' = -C
Now, we seek int (from 1 to e) 2ln x dx = 2 * int (from 1 to e) ln x dx
= 2 * [xln x - x] from 1 to e
= 2 * [(e * ln e - e) - (1 * ln 1 - 1)]
= 2 * [e * 1 - e - 1 * 0 + 1]
= 2
And GWB, the substitution u = ln x can (and does ) work, but I wouldn't encourage a 3u student to try it.
d/dx (xln x) = ln x * d/dx(x) + x * d/dx(ln x), using the product rule
= ln x * 1 + x * 1 / x
= ln x + 1
Integrating both sides with respect to x, we get:
xln x = int ln x dx + int 1 dx
xln x = int ln x dx + x + C, for some constant C.
So, int ln x dx = xln x - x + C', where C' = -C
Now, we seek int (from 1 to e) 2ln x dx = 2 * int (from 1 to e) ln x dx
= 2 * [xln x - x] from 1 to e
= 2 * [(e * ln e - e) - (1 * ln 1 - 1)]
= 2 * [e * 1 - e - 1 * 0 + 1]
= 2
And GWB, the substitution u = ln x can (and does ) work, but I wouldn't encourage a 3u student to try it.
KeypadSDM
B4nn3d
Let u = Ln[x]
x = e<sup>u</sup>
e<sup>u</sup>du = dx
:.
/
| 2ln[x]dx
/
=
/
|2ue<sup>u</sup>du
/
Note, d/du ue<sup>u</sup> = e<sup>u</sup> + ue<sup>u</sup>
:. ue<sup>u</sup> = d/du ue<sup>u</sup> - e<sup>u</sup>
/
|2ue<sup>u</sup>du
/
= 2ue<sup>u</sup> -
/
|2e<sup>u</sup>du
/
=2ue<sup>u</sup> - 2e<sup>u</sup> + C
I think ...
x = e<sup>u</sup>
e<sup>u</sup>du = dx
:.
/
| 2ln[x]dx
/
=
/
|2ue<sup>u</sup>du
/
Note, d/du ue<sup>u</sup> = e<sup>u</sup> + ue<sup>u</sup>
:. ue<sup>u</sup> = d/du ue<sup>u</sup> - e<sup>u</sup>
/
|2ue<sup>u</sup>du
/
= 2ue<sup>u</sup> -
/
|2e<sup>u</sup>du
/
=2ue<sup>u</sup> - 2e<sup>u</sup> + C
I think ...
George W. Bush
Banned
my apologies, it does indeed. I wasn't thinking laterally enough