| T.R | Title | User | Personal
Name | Date | Lines |
|---|
| 554.1 | Another conjecture | MODEL::YARBROUGH | | Thu Aug 07 1986 11:14 | 5 |
| After looking at the first few hundred lines of this triangle, I
have another conjecture:
The 2^n+1st line of this triangle contains three odd numbers
(the 1's at each end and the number in the middle); the rest
are even.
|
| 554.2 | let see these lines or the algorithm if you have one.. | THEBUS::KOSTAS | Wisdom is the child of experience. | Thu Aug 07 1986 12:18 | 7 |
| re. .1
can you include these few hundres lines in here, or maybe the algorithm
which generetes the numeric triangle, or even MAPPLE's function?
kgg
|
| 554.3 | BASIC program to display parity of triangle | MODEL::YARBROUGH | | Thu Aug 07 1986 12:29 | 29 |
| The following BASIC program displays the parity of the right half of the
triangle for the first 1000 lines. (Hmmm. I can't get rid of the
spaces in front of the first line below. Please delete them yourself.)
10 declare byte a(1000), b(1000)
declare integer i, j
20 a(1) = 1
b(1) = 1
print a(1)
30 for i = 2 to 1000
a(i) = 0
next i
40 for i = 2 to 1000
for j = 2 to i
b(j) = a(j-1) XOR a(j) XOR a(j+1)
next j
for j = 2 to i
a(j) = b(j)
next j
print i
for j = 1 to i
if (j/25%)*25% = j
then print a(j)
else print a(j);
end if
next j
print
print
next i
|
| 554.4 | What is MAPLE ? | EAGLE7::DANTOWITZ | David .. DTN: 226-6957 -- LTN2-1/H07 | Thu Aug 07 1986 12:39 | 5 |
|
What is MAPLE?
David
|
| 554.5 | info on MAPLE ... | THEBUS::KOSTAS | Wisdom is the child of experience. | Thu Aug 07 1986 13:08 | 26 |
| re. .4
This is from the DCL $ help maple
MAPLE
Maple is an interactive program which can algebraically manipulate
unbounded integers, exact rational numbers, real numbers with arbitrary
precision, symbolic formulae, polynomials, sets, lists, and equations.
It can solve systems of equations, differentiate formulae, and
integrate formulae. For information on Maple, see "Maple: A Sample
Interactive Session" or "First Leaves: A Tutorial Introduction to
Maple" or "MAPLE Reference Manual".
Format:
MAPLE [-s] [-l] [-b directory-name] [-q] [< File_Spec] [> File_Spec]
Additional information available:
Commands Library Parameters Initialization Files Interrupts VMS_commands
Enjoy,
Kostas G.
|
| 554.6 | | CLT::GILBERT | eager like a child | Thu Aug 07 1986 14:51 | 6 |
| re 554.1 n
2
This is equivalent to proving that ( ) is odd only when
k
n n-1
k = 0, 2 , or 2 . See note 558.4 for a hint on proving this.
|
| 554.7 | solution to .0 | THEBUS::KOSTAS | Wisdom is the child of experience. | Tue Aug 12 1986 12:43 | 40 |
| Well,
lets see if can contribute to the solution of the problem in .0.
The problem was: In the numerical triangle prove that in every row
beginning with the third, there is an even number.
1
1 1 1
1 2 3 2 1 3rd row
1 3 6 7 6 3 1 4th row
1 4 10 16 19 16 10 4 1 5th row
1 5 15 30 45 51 45 30 15 5 1 6th row
Denote the even numbers by the letter E and the odd numbers by
the letter O. The first 4 elements of the 3rd row have the notation
OEOE, the fourth OOEO, the fifth OEEE, the sixth OOOE, and
the seventh OEOE.
1
1 1 1
O E O E 1 3rd row
O O E O 6 3 1 4th row
O E E E 19 16 10 4 1 5th row
O O O E 45 51 45 30 15 5 1 6th row
The cycle then repeats, ( the first 4 elements of each row are
determined by the first four elements of the preceding row).
There will therefore be at least one even number in every row.
Enjoy,
Kostas G.
|
| 554.8 | Mod 3 is more interesting than mod 2 | MODEL::YARBROUGH | | Mon Aug 18 1986 12:20 | 3 |
| You get some interesting patterns by examining the residues modulo
3 of the numbers in this triangle. Hypothesis: the numbers in the
sum(3**n)-th row are all congruent to 1 modulo 3.
|