-
Best of luck to the class of 2024 for their HSC exams. You got this! Let us know your thoughts on the HSC exams here -
YOU can help the next generation of students in the community! Share your trial papers and notes on our Notes & Resources page
Integrating a squared function (1 Viewer)
- Thread starter bemer
- Start date
kwabon
Banned
[4x+3]^2
[4x+3]^3 / 4*3 + c
16x^2 + 24x + 9
16/3 x^3 + 24/2 x^2 + 9x + c
expand it out and hopefully, it will be the exact same thing.
now i see whats wrong, if you use the first method you get a 27/12 right? its a constant dw worry about it, that is why there is a +c in the second, if it was a definite integral, they would add up to be the exact same thing.
good luck
[4x+3]^3 / 4*3 + c
16x^2 + 24x + 9
16/3 x^3 + 24/2 x^2 + 9x + c
expand it out and hopefully, it will be the exact same thing.
now i see whats wrong, if you use the first method you get a 27/12 right? its a constant dw worry about it, that is why there is a +c in the second, if it was a definite integral, they would add up to be the exact same thing.
good luck
Last edited:
addikaye03
The A-Team
you just include the coefficient of x in the denominator
int (4x+3)^2 dx
[(4x+3)^3]/ 4.3 + C
(1/12)(4x+3)^3 + C
kwabon
Banned
edited my post.
samaccount123
Member
- Joined
- Aug 20, 2008
- Messages
- 119
- Gender
- Male
- HSC
- 2006
Narh Bemer, its the same..its just the constant is found out if you use the other method..both are correct unless they want you to graph it - then you need the constant..or easier to just substitute values and equate to find C
samaccount123
Member
- Joined
- Aug 20, 2008
- Messages
- 119
- Gender
- Male
- HSC
- 2006
Sup,
...lol, this was a long time since I done integration since 05.. anywayz.
I use another way to integrate it because I learnt this from Maths in focus book 2:
Since x in the function is to the power of 1 (invisible 1) after the coefficient of 4, you can use what addikaye has said (Which is only what 2 unit maths people should do - 3 unit maths people know another way of integrating this I think..thats what I remember)..
Firstly yeah, you gotta know what type of curve the function is and what type of integral you think its showing..either a trig integral or a exponential function..this one is basic.
Then check if its a function of a function or a chained function, this one is raised to the power of more than 1 and hence occurs more than once (i.e. to the power of 2 which happens twice)..so its a function of a function...forgot why but you gotta know what type of curve it is in general, lol.
Hence..
let u = (4x+3)
Therefore
Q1 = u^2
So Integral of u^2:
= u^3 / 3 + C
= 1/3 u^3 + C (1)
Therefore sub. (1) into Q1: (4x+3) ^ 3 / 3 + C
= 1/3 (4x + 3) ^ 3 + C
However what addikaye told you now applies, this is an important rule that only 2 unit students should use - 3 units can use 2 methods, one of which we dont know how to do:
So, yes..just multiply the co-efficient of x in the question to the denominator ONLY to the integrated answer (Which is the 2 unit RULE that MUST be remembered)
= 1/3 (4x + 3) ^ 3 . 1/4 + C
= 1/ 3.4 (4 x + 3) ^ 3 + C
= 1/12 (4x + 3) ^ 3 + C
MY way of doing this part however is just remembering something I saw in the maths in focus book, instead of remembering the words about the coefficient - just remember this rule/ formulae.
Area under the curve function = The Integral of [F(x)]^n X 1/F'(x) + C
So simply integrate the function..which is:
1/3 (4x + 3) ^ 3 + C (as above)
THEN:
1/ F'(x) = 1/ (4)
THEREFORE:
1/3 (4x+3) ^ 3 X 1/4
= 1/12 (4x+3) ^ 3 + C
...lol
...lol, this was a long time since I done integration since 05.. anywayz.
I use another way to integrate it because I learnt this from Maths in focus book 2:
Since x in the function is to the power of 1 (invisible 1) after the coefficient of 4, you can use what addikaye has said (Which is only what 2 unit maths people should do - 3 unit maths people know another way of integrating this I think..thats what I remember)..
Firstly yeah, you gotta know what type of curve the function is and what type of integral you think its showing..either a trig integral or a exponential function..this one is basic.
Then check if its a function of a function or a chained function, this one is raised to the power of more than 1 and hence occurs more than once (i.e. to the power of 2 which happens twice)..so its a function of a function...forgot why but you gotta know what type of curve it is in general, lol.
Hence..
Q1: (4x+3)^2
let u = (4x+3)
Therefore
Q1 = u^2
So Integral of u^2:
= u^3 / 3 + C
= 1/3 u^3 + C (1)
Therefore sub. (1) into Q1: (4x+3) ^ 3 / 3 + C
= 1/3 (4x + 3) ^ 3 + C
However what addikaye told you now applies, this is an important rule that only 2 unit students should use - 3 units can use 2 methods, one of which we dont know how to do:
So, yes..just multiply the co-efficient of x in the question to the denominator ONLY to the integrated answer (Which is the 2 unit RULE that MUST be remembered)
= 1/3 (4x + 3) ^ 3 . 1/4 + C
= 1/ 3.4 (4 x + 3) ^ 3 + C
= 1/12 (4x + 3) ^ 3 + C
MY way of doing this part however is just remembering something I saw in the maths in focus book, instead of remembering the words about the coefficient - just remember this rule/ formulae.
Area under the curve function = The Integral of [F(x)]^n X 1/F'(x) + C
So simply integrate the function..which is:
1/3 (4x + 3) ^ 3 + C (as above)
THEN:
1/ F'(x) = 1/ (4)
THEREFORE:
1/3 (4x+3) ^ 3 X 1/4
= 1/12 (4x+3) ^ 3 + C
...lolsamaccount123
Member
- Joined
- Aug 20, 2008
- Messages
- 119
- Gender
- Male
- HSC
- 2006
Since x in the function is to the power of 1 (invisible 1) after the coefficient of 4, you can use what addikaye has said (Which is only what 2 unit maths people should do - 3 unit maths people know another way of integrating this I think..thats what I remember)..
Yep same thing
, but you done a better technical work explaining it than mesamaccount123
Member
- Joined
- Aug 20, 2008
- Messages
- 119
- Gender
- Male
- HSC
- 2006
its not only the coefficient of x you have to include in the denominator, which is what addikaye has said previously..because there could be any other letter in there including the x.
e.g. (ax + by + c)..therefore it really is the inverse of the differential of the funtion multiplied by the integral of the question is what you really should do. But re-check that in your maths textbook to make sure.
Look like I've explained it the most, hah..St. JPHS 05 Maths FTW, yeah thats my HS..lol
e.g. (ax + by + c)..therefore it really is the inverse of the differential of the funtion multiplied by the integral of the question is what you really should do. But re-check that in your maths textbook to make sure.
Look like I've explained it the most, hah..St. JPHS 05 Maths FTW, yeah thats my HS..lol
samaccount123
Member
- Joined
- Aug 20, 2008
- Messages
- 119
- Gender
- Male
- HSC
- 2006
Somethings wrong with the site today, things aren't clear
- Joined
- Feb 16, 2005
- Messages
- 8,384
- Gender
- Male
- HSC
- 2006
If you are integrating with respect to x, the co-efficient of y is pretty much irrelevant, unless y = f(x) i.e. y is a function of x in which case you can substitute y for an expression in terms of x.