Equilibrium1
Member
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- Sep 23, 2011
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- HSC
- 2012
This may be a little hard to explain but, if it helps, I am referring to Q56(b) on Pg 210 of the 3 Unit Fitzpatrick book or, alternatively, the bottom of page 202 in the 3 unit Cambridge Textbook (Year 12).
Anyway, when asked to integrate a binomial expression, such as (1 + x)^n and represent it in the form of: [2^(n+1) - 1] / [n +1]
I'm having trouble obtaining the -1 in the numerator. I checked the working out and its because I did not add C (the constant). This makes sense, however, when you integrate (1 + x)^n (the LHS) and the expanded/sigma form (the RHS) wouldn't the C's simply cancel out?
Because in the working out in Cambridge and the Fitzpatrick solutions, they only add C on the RHS (i.e. the expanded/sigma form). Why don't they add C on the LHS? (since that side is integrated too).
I know how to work it out, but I just don't understand the part about the constant =/
Thankyou very much, I really appreciate it.
Anyway, when asked to integrate a binomial expression, such as (1 + x)^n and represent it in the form of: [2^(n+1) - 1] / [n +1]
I'm having trouble obtaining the -1 in the numerator. I checked the working out and its because I did not add C (the constant). This makes sense, however, when you integrate (1 + x)^n (the LHS) and the expanded/sigma form (the RHS) wouldn't the C's simply cancel out?
Because in the working out in Cambridge and the Fitzpatrick solutions, they only add C on the RHS (i.e. the expanded/sigma form). Why don't they add C on the LHS? (since that side is integrated too).
I know how to work it out, but I just don't understand the part about the constant =/
Thankyou very much, I really appreciate it.
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