Questions - MaplePrimes

Structure and number of doubles combinations...

Asked by: brian bovril 889

March 19 2024

0 9

Hi

A padel group organises doubles tournaments with the following structure: 16 players participate in four rounds, with each round consisting of four doubles matches. Players switch partners after each round.

So what I require is some code to generate the first round matches, the second round, the third, the nth .....

note the worksheet I bastardised from Tom Leslie's work.

2_man_teams_doubles.mw

Strange simplification of sqrt with sin(x) ...

Asked by: nm 8552

March 18 2024

2 9

it took me hrs to find this as my solution was failing verification and I did not know why.

What logic do you think Maple used to simplify this:

expr:=sqrt(1 + sin(x))/x;
simplify(expr)

To this

How could the above be simpler than

?

Compare to Mathematica

And this is what I expected. I am now scared to use simplify in Maple as I do not know what I will get back.

Is there a way to tell Maple not to do such strange "simplification"? I am doing this in code, and the code does not know what the expression is.

To see an example of the side effect of this, here is one, where if solution to an ode is simplified first, it no longer verifies by odetest without adding extra assumptions:

>	interface(version);

>

restart;

>	ode:=diff(y(x),x)=(cos(x)-2xy(x)^2)/(2x^2y(x)); sol:=dsolve([ode,y(Pi)=1/Pi]); odetest(sol,ode);

diff(y(x), x) = (1/2)*(cos(x)-2*x*y(x)^2)/(x^2*y(x))

>	odetest(simplify(sol),ode);

(1/4)*cos(x)*2^(1/2)*csgn(cos((1/2)*x)+sin((1/2)*x))^2*csgn(1, (1/2)*2^(1/2)*(cos((1/2)*x)+sin((1/2)*x)))/x

One does not expect that simplified solution no longer verfiies the ode.

Sure, I can do

odetest(simplify(sol),ode) assuming real;

and now it gives 0. But the point is that the first one did not need assumptions.

Download simplify_with_odetest.mw

Maple 2024 on windows 10.

Proc. Tabulate return results but keep access to a...

Asked by: Ronan 1022

March 18 2024

1 6

I am trying to tidy up cases where a proc returns multiple values. Have being trying Tabulate. I can get it to work when called after the results are returned. I would the procedure to do this but keep acces to the name(s) assigned to the returned values.

A,B,C:= proc(...) ..... return a, b, c end proc.

So basically display a tabulated of a, b, c.

>

restart

>

QQFProj := proc(q12::algebraic, q23::algebraic, q34::algebraic, q14::algebraic,{columns:=[QQFproj,Q13proj,Q24proj]},prnt::boolean:=true)
description "Projective quadruple quad formula and intermediate 13 and 24 quads. Useful for cyclic quadrilaterals";
local qqf,q13,q24, sub1,sub2,sub3, R;
#uses DT = DocumentTools;
sub1:= (q12 + q23 + q34 + q14)^2 - 2*(q12^2 + q23^2 + q34^2 + q14^2) ;
sub2:=-4*(q12*q23*q34+q12*q23*q14+q12*q34*q14+q23*q34*q14)+8*q12*q23*q34*q14;
sub3:=64*q12*q23*q34*q14*(1-q12)*(1-q23)*(1-q34)*(1-q14);
qqf:=(sub1+sub2)^2=sub3;
q13:=((q12-q23)^2-(q34-q14)^2)/(2*(q12+q23-q34-q14-2*q12*q23+2*q34*q14));#check this
q24:=((q23-q34)^2-(q12-q14)^2)/(2*(q23+q34-q12-q14-2*q23*q34+2*q12*q14));#check this
#if prnt then
#return [columns,[qqf,q13,q24]];

if prnt then
print(cat(" ",columns[1]," ",columns[2]," ",columns[3])) ;
end if;
return qqf ,q13,q24

end proc:

>	q12:=1/2:q23:=9/10:q34:=25/26:q41:=9/130: #Cyclic quadrilateral AA:=QQFProj(q12,q23,q34,q41,true); AA[1]; AA[2]; AA[3]

(1)

>	# Can the below be built into the proc to nicely didplay the results but maintain access to the results as shown when prnt=true.

>	columns:=[QQFproj,Q13proj,Q24proj]: BB:=QQFProj(q12,q23,q34,q41,false): DocumentTools:-Tabulate([columns,[BB]],width=55):#could do with a variable width depending on length of output epression.

>	BB[1]; BB[2]; BB[3]

(2)

>	dspformat:=(BB,columns)->DocumentTools:-Tabulate([columns,[BB]],width=75);

(3)

>	CC:=dspformat(BB,columns):#layout not as expected

>	CC[1] ; # just gives letters from Tabulate

(4)

>

Download 2024-03-18_Q_Format_Returned_Results_into_a_Table..mw

Standard Deviation ( Calculator/Maple)...

Asked by: jalal 380

March 18 2024

1 3

Hi,

I calculate the standard deviation using Maple, which differs from the standard deviation obtained by the calculator (TI). Can you provide an explanation for this difference?

Thanks

StDevQ.mw

How to transform this sine expression into a more ...

Asked by: sursumCorda 922

March 18 2024

1 4

I am trying to get Maple to simplify the following trigonometric expressions (for "generic" parameters) as much as possible:

sineExpr(3) := (
   sin(a[2] - b[1])*sin(a[3] - b[1]))/(
   sin(b[2] - b[1])*sin(b[3] - b[1]))*sin(a[1] - b[1]) + (
   sin(a[3] - b[2])*sin(a[1] - b[2]))/(
   sin(b[3] - b[2])*sin(b[1] - b[2]))*sin(a[2] - b[2]) + (
   sin(a[1] - b[3])*sin(a[2] - b[3]))/(
   sin(b[1] - b[3])*sin(b[2] - b[3]))*sin(a[3] - b[3]);
 = 
   


sineExpr(4) := (
   sin(a[2] - b[1])*sin(a[3] - b[1])*sin(a[4] - b[1]))/(
   sin(b[2] - b[1])*sin(b[3] - b[1])*sin(b[4] - b[1]))*
   sin(a[1] - b[1]) + (
   sin(a[3] - b[2])*sin(a[4] - b[2])*sin(a[1] - b[2]))/(
   sin(b[3] - b[2])*sin(b[4] - b[2])*sin(b[1] - b[2]))*
   sin(a[2] - b[2]) + (
   sin(a[4] - b[3])*sin(a[1] - b[3])*sin(a[2] - b[3]))/(
   sin(b[4] - b[3])*sin(b[1] - b[3])*sin(b[2] - b[3]))*
   sin(a[3] - b[3]) + (
   sin(a[1] - b[4])*sin(a[2] - b[4])*sin(a[3] - b[4]))/(
   sin(b[1] - b[4])*sin(b[2] - b[4])*sin(b[3] - b[4]))*
   sin(a[4] - b[4]);
 =

So far, all of my attempts have failed:

>

restart:

>	kernelopts('version');

>	Physics:-Version();

(1)

>

sineExpr := proc (m::posint) options operator, arrow; add(mul(ifelse(j <> t, (':-sin')(a[j]-b[t])/(':-sin')(b[j]-b[t]), (':-sin')(a[t]-b[t])), j = 1 .. m), t = 1 .. m) end proc

Warning, (in sineExpr) `t` is implicitly declared local

Warning, (in sineExpr) `j` is implicitly declared local

Warning, (in sineExpr) `t` is implicitly declared local

Warning, (in sineExpr) `j` is implicitly declared local

>	combine(simplify(normal(sineExpr(1), expanded), trig), trig);

(2)

>	combine(simplify(normal(sineExpr(2), expanded), trig), trig); # which can be transformed into sin((a[1]+a[2])-(b[1]+b[2])) only in certain legacy versions!

-(1/2)*(cos(-2*b[2]+a[1]+a[2])-cos(-2*b[1]+a[1]+a[2]))/sin(b[1]-b[2])

(3)

>	combine(simplify(normal(sineExpr(3), expanded), trig), trig);

(1/2)*(cos(-b[1]-3*b[2]+b[3]+a[2]+a[3]+a[1])-cos(b[1]-3*b[2]-b[3]+a[2]+a[3]+a[1])-cos(-b[1]-3*b[3]+a[2]+a[3]+a[1]+b[2])+cos(b[1]-3*b[3]-b[2]+a[2]+a[3]+a[1])+cos(-3*b[1]+a[2]+a[3]+a[1]+b[2]-b[3])-cos(-3*b[1]+a[2]+a[3]+a[1]-b[2]+b[3]))/(sin(-2*b[2]+2*b[1])-sin(-2*b[3]+2*b[1])+sin(2*b[2]-2*b[3]))

(4)

>	CodeTools:-Usage(combine(simplify(normal(sineExpr(4), expanded), trig), trig));

memory used=244.67MiB, alloc change=0 bytes, cpu time=6.17s, real time=5.49s, gc time=1000.00ms

(5)

>	CodeTools:-Usage(combine(simplify(normal(sineExpr(5), expanded), trig), trig)): # rather lengthy

memory used=4.23GiB, alloc change=-32.00MiB, cpu time=2.66m, real time=2.29m, gc time=29.98s

Can , , and be reduced to , , and respectively by Maple itself (that is, with as little user-intervention as possible) if one is not aware of such reductions in advance?

Download sinIdentity.mw

Note that because zero testing is frequently considerably easier, combine always succeeds in showing that the difference between the simplest possible and the original version is zero.

combine(sin((a[1]+a[2]+a[3])-(b[1]+b[2]+b[3]))-sineExpr(3));
 = 
                               0

combine(sin((a[1]+a[2]+a[3]+a[4])-(b[1]+b[2]+b[3]+b[4]))-sineExpr(4));
 = 
                               0

However, I wonder if Maple can thoroughly simplify them without knowing those known “simplest possible” form beforehand.
I also tried some other functions like rationalize, radnormal, and `convert/trig`, yet Maple appears to have not been capable of completely simplifying even the sub-simplest case 𝑚＝2. Is there any workaround?

Of note, it can be demonstrated inductively that ∀m∈ℕ_₊

where none of the denominators is 0. Nevertheless, as mentioned above, is it possible to transform and (as well as , if possible) into potentially more elegant forms (Ideally, is rewritten into , is rewritten into , and is rewritten into .) without any such a priori knowledge?
In Mma, these may be done using TrigReduce directly (cf. ); unfortunately, I cannot found a Maple equivalent to such functionality.

Getting u(0,0,3) for pde solutions...

Asked by: kencom1 110

March 18 2024

1 2

Good everyone,

I am solving a pde problem and I wanted to get the table values for u(0,0.1) but it's just returning the pds. Attach below is the maple worksheet for the code.

Anyone with suggestions, please.

Test.mw

Incomplete math in maple calculator...

Asked by: Wilfried Haensch 5

March 17 2024

1 6

When I calculate the edge values of a matrix the result is lengthy expression that could be simplified if evaluated numerically, Why is that not done?

How to get Help Overview to top of listing?...

Asked by: Ronan 1022

March 17 2024

0 5

I am writing help pages for a package. The inital Overview should be at the top of the listing like in other Maple help directories.

How to I do this? Mine is listing purely alphabetically.

Download Help_Edit_to_Database_2023.mw

Height of an ideal...

Asked by: Zeineb 520

March 17 2024

0 3

Dear all

I have an ideal, and code its definition and I compute the height but no result return. There is an error.

height_ideal.mw

Thank you for you help

efficient code for number of divides...

Asked by: jasser 55

March 17 2024

1 11

Hello

I am looking for an efficient code to divide a given integer n by another integer d as many times as possible.

For example:

For n=294912 and d=8 the answer shoud be 9, because 294912/8^5=9.

Thank you for your help.

why dsolve does not give this simple solution to f...

Asked by: nm 8552

March 17 2024

2 1

THis ode looks complicated

ode := (2*x^(5/2) - 3*y(x)^(5/3))/(2*x^(5/2)*y(x)^(2/3)) + ((-2*x^(5/2) + 3*y(x)^(5/3))*diff(y(x), x))/(3*x^(3/2)*y(x)^(5/3)) = 0;

But is actually a simple first order linear ode:

RHS:=solve(ode,diff(y(x),x));
new_ode:=diff(y(x),x)=RHS;

Whose solution is

But Maple gives this very complicated answer as shown below. When asking it to solve as linear ode, it now gives the much simpler solution.

Maple complicated solutions are all verified OK. But the question is, why did it not give this simple solution?

Attached worksheet. All on Maple 2024

>

restart;

>	interface(version);

>	Physics:-Version();

$`The "Physics Updates" version in the MapleCloud is 1700. The version installed in this computer is 1693 created 2024, March 7, 17:27 hours Pacific Time, found in the directory C:\Users\Owner\maple\toolbox\2024\Physics Updates\lib\`$

>	ode := (2x^(5/2) - 3y(x)^(5/3))/(2x^(5/2)y(x)^(2/3)) + ((-2x^(5/2) + 3y(x)^(5/3))diff(y(x), x))/(3x^(3/2)*y(x)^(5/3)) = 0;

(1/2)*(2*x^(5/2)-3*y(x)^(5/3))/(x^(5/2)*y(x)^(2/3))+(1/3)*(-2*x^(5/2)+3*y(x)^(5/3))*(diff(y(x), x))/(x^(3/2)*y(x)^(5/3)) = 0

>	DEtools:-odeadvisor(ode);

>	#why such complicated solutions? sol:=[dsolve(ode)];

>	#all solution are correct map(X->odetest(X,ode),sol);

>	RHS:=solve(ode,diff(y(x),x)); new_ode:=diff(y(x),x)=RHS;

>	dsolve(new_ode);

>	#force it to solve it as first order linear ode dsolve(ode,y(x),[`linear`])

Download why_missed_simple_solution_march_17_2024.mw

Why doesn't Maple simplify exponents....

Asked by: max125 175

March 17 2024

1 12

I am wondering why Maple simplifies (x^(1/3))^3 to x , but not (x^3)^(1/3) .
I even tried the surd function. I believe the surd function is for real number arguments, so it should simplify to x.

>

restart:

>	f:=x->x^3: g:=x->x^(1/3):

>	f(g(x)); g(f(x));

(1)

>	simplify((x^3)^(1/3))

(2)

>	simplify(x^(1/3))^3

(3)

>	simplify(surd(x^3,3))

(4)

>	simplify(surd(x,3)^3)

(5)

>

Download inverse1.mw

How to make a plot, because I have an Error...

Asked by: Pemudahijrah01 25

March 16 2024

0 6

Please, Help me to fix this error..

Download Grafik_R0kurang1.mw

What is substituted here...

Asked by: C_R 1960

March 16 2024

2 2

I cannot figure out which operand(?) is substituded here

subs(1 = 2, a*b);
                              2  2
                             a  b

Same for

subs(1 = 3, a + b);
                           3 a + 3 b

but

subs(1 = 2, a/b);
                                2
                               a 
                               --
                               b 

subs(1 = 3, a - b);
                            3 a - b

Is this by design?

is this a new bug in plot?...

Asked by: nm 8552

March 15 2024

1 5

In Maple 2022

restart;

res := t^3 - 3*t^2*sqrt(t^2*(12*sqrt(2)*ln(t) + 9*ln(t)^2 + 8)^(1/3))*ln(t)/(12*sqrt(2)*ln(t) + 9*ln(t)^2 + 8)^(2/3) - 2*t^2*sqrt(t^2*(12*sqrt(2)*ln(t) + 9*ln(t)^2 + 8)^(1/3))*sqrt(2)/(12*sqrt(2)*ln(t) + 9*ln(t)^2 + 8)^(2/3);
plot(res,t=-5..1)

gives

The same exact code in Maple 2024 gives

Worksheet is below.

Both on same PC. Windows 10.

Will report to Maplesoft, but thought to check also here is others have seen such problem before.

Btw, Maple 2022 plot is the correct one.