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Paradoxica

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Could you show your working out? I read the question wrong with 10 steps but with 15 steps, this is my working out:

15 Steps

3 Step // 1 Step

5 // 0 = 1 Way
4 // 3 = 35 Ways
3 // 6 = 84 Ways
2 // 9 = 55 Ways
1 // 12 = 13 Ways
0 // 15 = 1 Way

Therefore 189 ways.
You're right, I was counting the wrong diagonal set.

oops :)
 

leehuan

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This is going well beyond the scope of MX1 now but...





Drsoccerball and Paradoxica are not allowed to post their solutions
 
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Drsoccerball

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This is going well beyond the scope of MX1 now but...





Drsoccerball and Paradoxica are not allowed to post their solutions
This is even going beyond the course of MX2... It's evil to leave them wandering...

Hint: Instead of counting up count the ways you can finish.
 

Drsoccerball

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not 100% sure though
Yep. So the basic idea is which steps can I be on as I take my last step:



Extra question: Write a recurrence for the amount of ways I can climb n stairs using 1,2,3... or n step(s).

Should be easy now...
 

Paradoxica

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This is going well beyond the scope of MX1 now but...





Drsoccerball and Paradoxica are not allowed to post their solutions
I just constructed a diagonal line along the rows of Pascal's Triangle and proceeded to count which cells represent a set of possible paths, then sum them all together. Which is basically what si1236 did.

No complicated enumeration required.
 

Paradoxica

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Yep. So the basic idea is which steps can I be on as I take my last step:



Extra question: Write a recurrence for the amount of ways I can climb n stairs using 1,2,3... or n step(s).

Should be easy now...
Hence, express the general solution as the powers of the roots of the recurrence's characteristic polynomial.
 

si2136

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General question. Are you allowed to start on the RHS for Trig Identities? I never have done that before.
 
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