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Groups > comp.lang.python > #106730 > unrolled thread
| Started by | Joe <lildinho14@gmail.com> |
|---|---|
| First post | 2016-04-09 07:18 -0700 |
| Last post | 2016-04-09 14:28 -0700 |
| Articles | 8 — 4 participants |
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Find the number of robots needed to walk through the rectangular grid Joe <lildinho14@gmail.com> - 2016-04-09 07:18 -0700
Re: Find the number of robots needed to walk through the rectangular grid Ian Kelly <ian.g.kelly@gmail.com> - 2016-04-09 10:43 -0600
Re: Find the number of robots needed to walk through the rectangular grid Joe <lildinho14@gmail.com> - 2016-04-09 10:13 -0700
Re: Find the number of robots needed to walk through the rectangular grid Dennis Lee Bieber <wlfraed@ix.netcom.com> - 2016-04-09 15:10 -0400
Re: Find the number of robots needed to walk through the rectangular grid Mark Lawrence <breamoreboy@yahoo.co.uk> - 2016-04-09 20:23 +0100
Re: Find the number of robots needed to walk through the rectangular grid Joe <lildinho14@gmail.com> - 2016-04-09 12:41 -0700
Re: Find the number of robots needed to walk through the rectangular grid Mark Lawrence <breamoreboy@yahoo.co.uk> - 2016-04-09 20:55 +0100
Re: Find the number of robots needed to walk through the rectangular grid Joe <lildinho14@gmail.com> - 2016-04-09 14:28 -0700
| From | Joe <lildinho14@gmail.com> |
|---|---|
| Date | 2016-04-09 07:18 -0700 |
| Subject | Find the number of robots needed to walk through the rectangular grid |
| Message-ID | <8c570da8-ab31-44f3-9fdf-83e28741ffe4@googlegroups.com> |
How to find the number of robots needed to walk through the rectangular grid
The movement of a robot in the field is divided into successive steps
In one step a robot can move either horizontally or vertically (in one row or in one column of cells) by some number of cells
A robot can move in one step from cell X to cell Y if and only if the distance between the centers of the cells X and Y is equal to the sum of integers contained in X and Y
Cell X is reachable for robot A if either A is currently standing in the cell X or A can reach X after some number of steps. During the transfer the robot can choose the direction (horizontal or vertical) of each step arbitrarily
[![enter image description here][1]][1]
I started implementing it by first checking the row and print the index of the Cell X and Y where the distance is equal to the sum of integers contained in X and Y
but after coding I found it difficult to remember the index when moving vertically
So I thought to Build a graph where nodes are grid cells and edges are legal direct movements, then run any connected components algorithm to find which cells are reachable from each other
Can anyone implement it with graphs or queue?
Input
4 6
3 1 3 2 0 0
1 3 2 1 2 1
3 3 1 0 1 2
1 2 0 2 3 3
Output
6
My code so far
def row_walk(inputstring):
inputs = inputstring.split(" ")
row_number, column_number = int(inputs[0]), int(inputs[1])
matrix = [list(map(int, input().split())) for _ in range(row_number)]
matrix_transposed = (np.transpose(matrix)).tolist()
used = set()
for i, r1 in enumerate(matrix[0]):
for j, r2 in enumerate(matrix[0]):
if j > i and r1+r2 == j-i:
used.update((i, j))
cell_movement = [x for x in range(len(matrix[0])) if x not in used]
trivial_cell = [y for y in range(len(matrix[0])) if y in used]
return cell_movement, trivial_cell
if __name__=="__main__":
print(row_walk(input()))
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| From | Ian Kelly <ian.g.kelly@gmail.com> |
|---|---|
| Date | 2016-04-09 10:43 -0600 |
| Message-ID | <mailman.129.1460220245.2253.python-list@python.org> |
| In reply to | #106730 |
On Sat, Apr 9, 2016 at 8:18 AM, Joe <lildinho14@gmail.com> wrote: > How to find the number of robots needed to walk through the rectangular grid > The movement of a robot in the field is divided into successive steps > > In one step a robot can move either horizontally or vertically (in one row or in one column of cells) by some number of cells > > A robot can move in one step from cell X to cell Y if and only if the distance between the centers of the cells X and Y is equal to the sum of integers contained in X and Y > > Cell X is reachable for robot A if either A is currently standing in the cell X or A can reach X after some number of steps. During the transfer the robot can choose the direction (horizontal or vertical) of each step arbitrarily > [![enter image description here][1]][1] > > I started implementing it by first checking the row and print the index of the Cell X and Y where the distance is equal to the sum of integers contained in X and Y > > but after coding I found it difficult to remember the index when moving vertically > > So I thought to Build a graph where nodes are grid cells and edges are legal direct movements, then run any connected components algorithm to find which cells are reachable from each other > > > Can anyone implement it with graphs or queue? I'd use a disjoint-set data structure. The number of robots needed is equal to the number of disjoint subsets. https://en.wikipedia.org/wiki/Disjoint-set_data_structure
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| From | Joe <lildinho14@gmail.com> |
|---|---|
| Date | 2016-04-09 10:13 -0700 |
| Message-ID | <e42777b0-fc2b-4f2c-8c2b-a53b41bfe3f7@googlegroups.com> |
| In reply to | #106746 |
On Saturday, 9 April 2016 18:44:20 UTC+2, Ian wrote: > On Sat, Apr 9, 2016 at 8:18 AM, Joe wrote: > > How to find the number of robots needed to walk through the rectangular grid > > The movement of a robot in the field is divided into successive steps > > > > In one step a robot can move either horizontally or vertically (in one row or in one column of cells) by some number of cells > > > > A robot can move in one step from cell X to cell Y if and only if the distance between the centers of the cells X and Y is equal to the sum of integers contained in X and Y > > > > Cell X is reachable for robot A if either A is currently standing in the cell X or A can reach X after some number of steps. During the transfer the robot can choose the direction (horizontal or vertical) of each step arbitrarily > > [![enter image description here][1]][1] > > > > I started implementing it by first checking the row and print the index of the Cell X and Y where the distance is equal to the sum of integers contained in X and Y > > > > but after coding I found it difficult to remember the index when moving vertically > > > > So I thought to Build a graph where nodes are grid cells and edges are legal direct movements, then run any connected components algorithm to find which cells are reachable from each other > > > > > > Can anyone implement it with graphs or queue? > > I'd use a disjoint-set data structure. The number of robots needed is > equal to the number of disjoint subsets. > > https://en.wikipedia.org/wiki/Disjoint-set_data_structure Could you post a formal solution of disjoint-set using my algorithm
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| From | Dennis Lee Bieber <wlfraed@ix.netcom.com> |
|---|---|
| Date | 2016-04-09 15:10 -0400 |
| Message-ID | <mailman.135.1460229024.2253.python-list@python.org> |
| In reply to | #106747 |
On Sat, 9 Apr 2016 10:13:04 -0700 (PDT), Joe <lildinho14@gmail.com>
declaimed the following:
>Could you post a formal solution of disjoint-set using my algorithm
You've been given a suggestion to a possible means of solving the
assignment -- researching that solution is now on your side of the fence.
We don't do homework... And likely your algorithm is incompatible with
the concept (I've not bothered to google "disjoint set").
Especially as nothing in this is Python specific -- working out the
algorithm IS the assignment; Python is just the means of implementing the
algorithm. When something doesn't work in your Python implementation, we
might offer further advice about how the language works.
{My birthday was a few days ago -- I'm transitioning in the "crotchety old
man stage")
--
Wulfraed Dennis Lee Bieber AF6VN
wlfraed@ix.netcom.com HTTP://wlfraed.home.netcom.com/
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| From | Mark Lawrence <breamoreboy@yahoo.co.uk> |
|---|---|
| Date | 2016-04-09 20:23 +0100 |
| Message-ID | <mailman.137.1460229825.2253.python-list@python.org> |
| In reply to | #106747 |
On 09/04/2016 18:13, Joe wrote: > On Saturday, 9 April 2016 18:44:20 UTC+2, Ian wrote: >> On Sat, Apr 9, 2016 at 8:18 AM, Joe wrote: >>> How to find the number of robots needed to walk through the rectangular grid >>> The movement of a robot in the field is divided into successive steps >>> >>> In one step a robot can move either horizontally or vertically (in one row or in one column of cells) by some number of cells >>> >>> A robot can move in one step from cell X to cell Y if and only if the distance between the centers of the cells X and Y is equal to the sum of integers contained in X and Y >>> >>> Cell X is reachable for robot A if either A is currently standing in the cell X or A can reach X after some number of steps. During the transfer the robot can choose the direction (horizontal or vertical) of each step arbitrarily >>> [![enter image description here][1]][1] >>> >>> I started implementing it by first checking the row and print the index of the Cell X and Y where the distance is equal to the sum of integers contained in X and Y >>> >>> but after coding I found it difficult to remember the index when moving vertically >>> >>> So I thought to Build a graph where nodes are grid cells and edges are legal direct movements, then run any connected components algorithm to find which cells are reachable from each other >>> >>> >>> Can anyone implement it with graphs or queue? >> >> I'd use a disjoint-set data structure. The number of robots needed is >> equal to the number of disjoint subsets. >> >> https://en.wikipedia.org/wiki/Disjoint-set_data_structure > > Could you post a formal solution of disjoint-set using my algorithm > You write the code, we comment on it. No code, no comment. Got the message? -- My fellow Pythonistas, ask not what our language can do for you, ask what you can do for our language. Mark Lawrence
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| From | Joe <lildinho14@gmail.com> |
|---|---|
| Date | 2016-04-09 12:41 -0700 |
| Message-ID | <4bdfe218-11a6-4866-b1c3-e3a2e0661e47@googlegroups.com> |
| In reply to | #106757 |
On Saturday, 9 April 2016 21:24:02 UTC+2, Mark Lawrence wrote: > On 09/04/2016 18:13, Joe wrote: > > On Saturday, 9 April 2016 18:44:20 UTC+2, Ian wrote: > >> On Sat, Apr 9, 2016 at 8:18 AM, Joe wrote: > >>> How to find the number of robots needed to walk through the rectangular grid > >>> The movement of a robot in the field is divided into successive steps > >>> > >>> In one step a robot can move either horizontally or vertically (in one row or in one column of cells) by some number of cells > >>> > >>> A robot can move in one step from cell X to cell Y if and only if the distance between the centers of the cells X and Y is equal to the sum of integers contained in X and Y > >>> > >>> Cell X is reachable for robot A if either A is currently standing in the cell X or A can reach X after some number of steps. During the transfer the robot can choose the direction (horizontal or vertical) of each step arbitrarily > >>> [![enter image description here][1]][1] > >>> > >>> I started implementing it by first checking the row and print the index of the Cell X and Y where the distance is equal to the sum of integers contained in X and Y > >>> > >>> but after coding I found it difficult to remember the index when moving vertically > >>> > >>> So I thought to Build a graph where nodes are grid cells and edges are legal direct movements, then run any connected components algorithm to find which cells are reachable from each other > >>> > >>> > >>> Can anyone implement it with graphs or queue? > >> > >> I'd use a disjoint-set data structure. The number of robots needed is > >> equal to the number of disjoint subsets. > >> > >> https://en.wikipedia.org/wiki/Disjoint-set_data_structure > > > > Could you post a formal solution of disjoint-set using my algorithm > > > > You write the code, we comment on it. No code, no comment. Got the > message? > > -- > My fellow Pythonistas, ask not what our language can do for you, ask > what you can do for our language. > > Mark Lawrence Sorry, I was desperate I deleted the post
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| From | Mark Lawrence <breamoreboy@yahoo.co.uk> |
|---|---|
| Date | 2016-04-09 20:55 +0100 |
| Message-ID | <mailman.141.1460231737.2253.python-list@python.org> |
| In reply to | #106761 |
On 09/04/2016 20:41, Joe wrote: > > Sorry, I was desperate > I deleted the post > You didn't. This will be showing in the archives in several places, e.g https://mail.python.org/pipermail/python-list/2016-April/707160.html -- My fellow Pythonistas, ask not what our language can do for you, ask what you can do for our language. Mark Lawrence
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| From | Joe <lildinho14@gmail.com> |
|---|---|
| Date | 2016-04-09 14:28 -0700 |
| Message-ID | <a23155e3-7e86-4ace-b299-1f93d7224eb3@googlegroups.com> |
| In reply to | #106762 |
On Saturday, 9 April 2016 21:55:50 UTC+2, Mark Lawrence wrote: > On 09/04/2016 20:41, Joe wrote: > > > > Sorry, I was desperate > > I deleted the post > > > > You didn't. This will be showing in the archives in several places, e.g > https://mail.python.org/pipermail/python-list/2016-April/707160.html > > -- > My fellow Pythonistas, ask not what our language can do for you, ask > what you can do for our language. > > Mark Lawrence Well its still there, next time I'll not make the same mistake hopefully
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