opper is all these values "recognizing" as similar/same.
I got list of results (n) with following values:
0. -3.2584e-9 1. -4.4992e-9 2. -6.7220e-9 3. -4.5154e-9 4. -4.3325e-9 5. -2.2496e-9 6. -2.2385e-9 7. -6.7525e-9 8. -4.5154e-9
Even though most of these values (maybe all of them) "go" into the second group:
(10^(-9)≤n) and (n>10^(-4))
Grasshopper recognizes all of them as members of the first group:
10^(-4)≥n
I am aware that this kind of very small values are unusual, and maybe Grasshopper is not made for it. But is there any way this can be done?
Take a look:
Thank you.…
I have this :
list 3 : 0 1 2 3 4 5 6
list 2 : 0 1 2 3 4 5 6
list 1 : 0 1 2 3 4 5 6
list 0 : 0 1 2 3 4 5 6
and I want to group the points of index 0 in a branch, the points of index 1 in another branch and so on.
I attached a file in which I generated the points.
Thank you in advance for your help !
Regards
Red…
rns 10,000. That is 10 cubed.
As it stands Pow returns A to the power of B+1 for any B value 0 and greater. For B values of -1 or less it gives A to the power of 1.
Thanks,
Steven…
Added by Steven Hall at 5:56pm on September 7, 2010
shopper, it is shown as {a,b}.
For example, sqrt(-4) = sqrt(4 * -1) = sqrt(4) * sqrt(-1) = 2 * i = 0 + 2i. Therefore, this will be {0, 2} in Grasshopper.…
and B inputs. This gives the odd results. I replaced the B Panel with an integer slider and the Pow component works properly.
When I use a Panel for B I get the following results (A panel is 10):
B=0 R=10
B=1 R=100
B=2 R=10,000
B=3 R=100,000,000…
Added by Steven Hall at 7:38pm on September 7, 2010
middle index, and choose that point with List Item. If even, for example 4 points (0, 1, 2, 3), you'll get 2, so subtract one and choose those two indices, 1 and 2. I only had a few minutes to play with this, so it isn't a fully-baked solution, but it should take you a little further.…
only with {1;0} {1;1} {1;2}
Explanation to contents using first point (left):
{0;0} contains a point, {0;0} has 4 Points, {0;1} has 4 Points, {0;2} has 4 Points
the Mid-point of a line) The 4 points in a sub-set are the Mid-points of the edges of a
4-edged surface
The aim is to determine if a 4-edged surface has the line in question as an edge (left side, line represented through its mid-point )
…