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Let's say I have matrix pa till pz as shown below:

pa= [0;0;0;0;0]';
pb=[-0.2;-0.2;-0.2;-0.2;0.8]';
pc=[-1.2;0.4;1.9;2.3;9.0]';
pd=[  ];
pe=[  ];

till pz

Va=pa(1);
Vb=pa(2);
Vc=pa(3);
Vd=pa(4);
Ve=pa(5);
vdt=[1;0.309;-0.809;-0.809;0.309]'

Then multiply using this formula

Vdtransformation=Vdt*[Va;Vb;Vc;Vd;Ve]

I need to multiply

Vdtransformation=Vdt*[Va;Vb;Vc;Vd;Ve] 

But with changing the value of

Va=pb(1);Vb=pb(2);Vc=pb(3);Vd=pb(4);Ve=pb(5);

And also do it again for

Va=pc(1);Vb=pc(2);Vc=pc(3);Vd=pc(4);Ve=pc(5);

till pz.

Is there any simpler way to do it? Should i use bsxfun?

share|improve this question
    
try doc eval and read the documentation. –  natan Mar 13 '13 at 5:51
    
@natan Some guidance will be appreciated. –  dan Mar 13 '13 at 5:58
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closed as not constructive by natan, Emil, Stony, Björn Kaiser, Graviton Mar 14 '13 at 3:57

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2 Answers

up vote 1 down vote accepted

Let P=[pa,pb,...,pz] be a matrix with 5 lines and the number of letters in the alphabet columns.

Do V=Vdt*P. You are done. Each column of V is the Vdtransformation relative to each pa, pb, ...

share|improve this answer
    
the reason i dont do like what u said is because Inner matrix dimensions didnt agree.... –  dan Mar 13 '13 at 22:51
    
@dan, the dimmensions do agree! Take a careful look! Note that P is a matrix with 5 lines and the number of letters in the alphabet columns and Vdt is 1x5. Thus, V=Vdt(1x5) * P(5xnumberOfLetters); Therefore, the dimmensions do agree! –  DanielTheRocketMan Mar 13 '13 at 23:26
    
ouwh sorry..its my mistakes.thanks –  dan Mar 13 '13 at 23:41
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First, there's no logic in writing Vdt*[Va;Vb;Vc;Vd;Ve] where you can instead write Vdt*pa' which is equivalent, or better see @Daniel answer.

Second, if you want to cycle names of variables you can use eval. For example, if my variables are:

pa=1;
pb=2;
pc=3;
A=3;

and I want to calc A*pa, A*pb, etc, I can create a string of the letters needed

lett=char(97:99); % this creates the string 'abc'

Then for loop "

for i=1:numel(lett)
    A*eval(['p' lett(i)])
end
share|improve this answer
    
as u can see the pa,pb,pc and etc is the matrix..matrix dimensions did'nt agree –  dan Mar 13 '13 at 23:13
    
I didn't try to solve your code, just show you the way to use eval. If you don't know how to solve the matrix dimension issue, you should read matlab's documentation on matrix manipulations, such as transpose, etc. –  natan Mar 14 '13 at 4:56
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