EViL.GENiUS
Black Member
- Joined
- Aug 29, 2007
- Messages
- 31
- Gender
- Male
- HSC
- 2008
Hi could someone help me here.
Prove by mathematical induction.
Prove by mathematical induction.
-
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
Re: Prove by mathematical induction. (1 Viewer)
- Thread starter EViL.GENiUS
- Start date
- Joined
- Feb 16, 2005
- Messages
- 8,384
- Gender
- Male
- HSC
- 2006
When n = 1
LHS = 1 + 1 = 2
RHS = 1(3 + 1)/2 = 2
LHS = RHS
.: statement is true for n = 1
Assume the statement is true for n = k
(k + 1) + (k + 2) + ...... + (2k - 1) + (2k) = k(3k + 1)/2
Need to prove it is true for n = k + 1
(k + 2) + (k + 3) + ...... + (2k + 1) + (2k + 2) = (k + 1)(3k + 4)/2
LHS = (k + 2) + (k + 3) + ...... + (2k) + (2k + 1) + (2k + 2)
= k(3k + 1)/2 - (k + 1) + 2k + 1 +2k + 2 by assumption
= k(3k + 1)/2 + 3k + 2
= (3k² + 7k + 4)/2
= (k + 1)(3k + 4)/2
= RHS
[insert conclusion here....]
LHS = 1 + 1 = 2
RHS = 1(3 + 1)/2 = 2
LHS = RHS
.: statement is true for n = 1
Assume the statement is true for n = k
(k + 1) + (k + 2) + ...... + (2k - 1) + (2k) = k(3k + 1)/2
Need to prove it is true for n = k + 1
(k + 2) + (k + 3) + ...... + (2k + 1) + (2k + 2) = (k + 1)(3k + 4)/2
LHS = (k + 2) + (k + 3) + ...... + (2k) + (2k + 1) + (2k + 2)
= k(3k + 1)/2 - (k + 1) + 2k + 1 +2k + 2 by assumption
= k(3k + 1)/2 + 3k + 2
= (3k² + 7k + 4)/2
= (k + 1)(3k + 4)/2
= RHS
[insert conclusion here....]
Last edited:
EViL.GENiUS
Black Member
- Joined
- Aug 29, 2007
- Messages
- 31
- Gender
- Male
- HSC
- 2008
3k² + 5k + 4 doesn't equal (k + 1)(3k + 4)Trebla said:
are you sure there isn't a mistake in the question, because I am getting the same second last line as the other guy...(3k^2+5k+4)/2..but that doesn't factorise nicely.
I can get to (3k+2)(k+1)/2 but not (3k+4)(k+1)/2
I can get to (3k+2)(k+1)/2 but not (3k+4)(k+1)/2
Last edited:
EViL.GENiUS
Black Member
- Joined
- Aug 29, 2007
- Messages
- 31
- Gender
- Male
- HSC
- 2008
I checked the question again it is correct.donetha said:
3unitz
Member
- Joined
- Nov 18, 2006
- Messages
- 161
- Gender
- Undisclosed
- HSC
- N/A
assume true for n = k,EViL.GENiUS said:Hi could someone help me here.
Prove by mathematical induction.
(k + 1) + (k + 2) + ... + (2k)= k(3k + 1)/2
n = k+1
[(k + 1) + 1] + [(k + 1) + 2] + ... + [(k+1) + (k+1)] = (k+ 1) [3(k + 1) + 1]/2
LHS = [(k + 1) + 1] + [(k + 1) + 2] + ... +[(k+1) + k] + [(k+1) + (k+1)]
= k(3k + 1)/2 + k + [(k+1) + (k+1)] (using assumption)***
= k(3k + 1)/2 + 2k/2 + 4(k+1)/2
= (3k^2 + k + 2k + 4k + 4)/2
= (3k^2 + 7k + 4)/2
= (k+1)(3k+4)/2
RHS = (k+ 1) [3(k + 1) + 1]/2 = (k+1)(3k+4)/2 = LHS
*** the colour parts just try to show how the assumption was used:
the red parts is the assumption
the blue parts are the left over 1's (which add to give k)
the orange part is just the left over part
3unitz
Member
- Joined
- Nov 18, 2006
- Messages
- 161
- Gender
- Undisclosed
- HSC
- N/A
you can always check the question yourself using series:donetha said:
LHS = (n + 1) + (n + 2) + (n + 3) + ... + (n + n)
= (n x n) + (1 + 2 + 3 + ... + n)
= n^2 + (n/2)(1 + n)
= (2n^2 + n + n^2)/2
= (3n^2 + n)/2
= n(3n + 1)/2
= RHS
before my teacher taught us induction, she said it was really really difficult, and but i've learnt it, && i've found it pretti easy...is there something im missing? did u guys find it that difficult to understand? thanx.
EViL.GENiUS
Black Member
- Joined
- Aug 29, 2007
- Messages
- 31
- Gender
- Male
- HSC
- 2008
Induction questions vary in difficulty but mostly it just, put n=1, the n=k and try to make n=k+1 from n=k
