how solve nonlinear equations ?
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how to solve nonlinear equations ?
these 9 equations in 3 unknown but nonlinear
31.65951=sqrt((20460991.052399-x)^2+(11012393.207537-y)^2+(13140061.841029-z)^2)-sqrt((20462649.31-x)^2+(11012196.356-y)^2+(13137623.266-z)^2) 243.75898=sqrt((1704791.07688-x)^2+(20550181.098118-y)^2+(16863812.406607-z)^2)-sqrt((1706135.95-x)^2+(20548561.881-y)^2+(16865760.323-z)^2) -349.85327=sqrt((18327975.818007-x)^2+(1722639.77547-y)^2+(18786981.252914-z)^2)-sqrt((18326680.829-x)^2+(1720514.194-y)^2+(18788376.839-z)^2) -575.16382=sqrt((12050174.649623-x)^2+(-9980816.456693-y)^2+(21382458.132242-z)^2)-sqrt((12049062.298-x)^2+(-9983309.044-y)^2+(21381885.534-z)^2) 441.83588=sqrt((6415962.553149-x)^2+(15826350.755284-y)^2+(20754833.300093-z)^2)-sqrt((6418526.123-x)^2+(15826408.315-y)^2+(20754019.037-z)^2) -255.03605=sqrt((18966834.575125-x)^2+(6395897.26812-y)^2+(17720969.794907-z)^2)-sqrt((18965851.475-x)^2+(6393896.947-y)^2+(17722730.048-z)^2) 258.29132=sqrt((26283508.487939-x)^2+(-1051136.220342-y)^2+(4730820.234619-z)^2)-sqrt((26282933.567-x)^2+(-1051377.055-y)^2+(4733941.445-z)^2) -550.04848=sqrt((15456741.418182-x)^2+(19573966.047127-y)^2+(-9158923.170409-z)^2)-sqrt((15456435.97-x)^2+(19572808.522-y)^2+(-9161842.101-z)^2) 549.43288=sqrt((25702282.7043-x)^2+(2962424.062583-y)^2+(-6373870.064627-z)^2)-sqrt((25703029.058-x)^2+(2962107.626-y)^2+(-6370839.228-z)^2) but when using solve function [x,y,z] = solve('sqrt((20460991.052399-x)^2+(11012393.207537-y)^2+(13140061.841029-z)^2)-sqrt((20462649.31-x)^2+(11012196.356-y)^2+(13137623.266-z)^2)=31.65951', 'sqrt((1704791.07688-x)^2+(20550181.098118-y)^2+(16863812.406607-z)^2)-sqrt((1706135.95-x)^2+(20548561.881-y)^2+(16865760.323-z)^2)=243.75898', 'sqrt((18327975.818007-x)^2+(1722639.77547-y)^2+(18786981.252914-z)^2)-sqrt((18326680.829-x)^2+(1720514.194-y)^2+(18788376.839-z)^2)=-349.85327', 'sqrt((12050174.649623-x)^2+(-9980816.456693-y)^2+(21382458.132242-z)^2)-sqrt((12049062.298-x)^2+(-9983309.044-y)^2+(21381885.534-z)^2)=-575.16382', 'sqrt((6415962.553149-x)^2+(15826350.755284-y)^2+(20754833.300093-z)^2)-sqrt((6418526.123-x)^2+(15826408.315-y)^2+(20754019.037-z)^2)=441.83588', 'sqrt((18966834.575125-x)^2+(6395897.26812-y)^2+(17720969.794907-z)^2)-sqrt((18965851.475-x)^2+(6393896.947-y)^2+(17722730.048-z)^2)=-255.03605', 'sqrt((26283508.487939-x)^2+(-1051136.220342-y)^2+(4730820.234619-z)^2)-sqrt((26282933.567-x)^2+(-1051377.055-y)^2+(4733941.445-z)^2)=258.29132', 'sqrt((15456741.418182-x)^2+(19573966.047127-y)^2+(-9158923.170409-z)^2)-sqrt((15456435.97-x)^2+(19572808.522-y)^2+(-9161842.101-z)^2)=-550.04848', 'sqrt((25702282.7043-x)^2+(2962424.062583-y)^2+(-6373870.064627-z)^2)-sqrt((25703029.058-x)^2+(2962107.626-y)^2+(-6370839.228-z)^2)=549.43288')
the solution was empty x = [ empty sym ] y = [] z = []
why???????????????????/
5 commentaires
Erik S.
le 18 Fév 2015
Can you send a .m file instead, very hard to read the code above. Do you have optimization toolbox?
ahmed ashiry
le 18 Fév 2015
ahmed ashiry
le 18 Fév 2015
Erik S.
le 18 Fév 2015
Since it is an overdetermined system (more equations than variables) is it a least squars solution you need or what do you mean by solution?
ahmed ashiry
le 18 Fév 2015
Réponse acceptée
Erik S.
le 18 Fév 2015
0 votes
Look in the documentation for the function lsqnonlin
It can solve nonlinear least squares problems.
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