EXAMPLES ECONOMCI MODEL UNCERATANICITY OF CERTAIN TOPOLOGY :-->

in it if in the field of uncretainity that field is F , then to make the certain codntion for new model we need two certain with uncertain need extra varible of cost cutting inveetment increaement to so manhy bother things GC=s in it actual rate of growth is unceratins and ,marginal capital outptu ratio is uncertain and saving icnoem ratio is certain how kit coud bring in relaity where rate of growth in uncertaina nd margianl capitla outptu ratio is uncertain we adjust to thing one unveratin variable in anotehr field where with field that uncertain saving income is uncertain then then it put in anotehr field that have certain field of shape where it uncertainty could fit in that shape and then filed that density that is uncertain is equal to density of groeth is uncertains and margianl capital output ratio in whcih field with tehri shape is uncertain and anotehr field where saving incoem ratio shape is is becoem ceratin in anotehr field not field of above these two varianle and have equation is well manner then they could be certain by the density of field ratio and filed of otehrs means to put uncertainity the field in which two or more then two variable fucnitom uncertain taht ahve many variable then others with uncretain filed that si bigger then teh field of lefy havnd side and also ahving one varible that is certain with own funciton could equal if the desity of motion of field is equal motion of field of functions how so the formaul is cretaed here F(d1*d2) = F1(d3) so G=is equal to deltaY/Y so here if we take Y=f(K) here field of of y=f(k) if f1 where shape of kapitla is y=f(x,y) and non continious then also dy/dk , c= dy/dk=y/k is marginal product of capitla is constants it also in field f1 capiatl mariganla nd avegr pproduct of field is equal sY=S=I prduct of saving arte and output is equal to to saving in field f2 delta k = I-lembdaK so that comes in different fields so we make th curves of them to resheod them we make linear non linear graph of them means for c amd y in F1 and I investemtn in differnet and saving in different field means in F1 and we checks function continuous with f1 field unceranity if thsi field is uncertain with and non continuous with eahc other and in non contous shapes and then means y = f(k) c=(y,k) is unceratin and non continous with non continuous shapes and they then if saving S=I svaing in investment if h=their field must to take ceratinity not if thsi is unceratin with field f1 so we take anotehr field f2 to make it certains delat k = I-lambda K also take in field f2 then we can take field ratio to take wihcih is most certain which is less un certains field could be nay curves and field varibel could be any point on curve c= dy/dk then dy would be the y in some ways in some field f1 means we take integrative point y(t+1)-y(t)/k(t)+sy(t)-deltak(t)-k(t) then solve it so how it woudl solve we solve it by field methods we cross operation with vectore of it and dot opertaor things be to do. so we chekc y(t+1)-y(t) it will be do by unceraatin with unceragtin field to make unconours fucntion like so we terat them as uncerain variable on axis where we make y(t+1) - y(t) as a(x+1)-b(x)/c(x)+sd(x)-delta l(x)-m(x) then we make shape of it if it foudn continous inetgragraitive in reuslyt it is for exmape then it menas they are from diffeent field but certain in unceratnotyt we do continous intgeration of them , then to fidn out their difeernnee in unceratinity of field so we make field equaiotn e could make any field eqaiton from gthat varibale s so we do this now waht we have to done of we cant find ceratnicyt in unceratian fields of them them we chnage the field to fidn of their certainicity if all varibel that was uncertains in unceratin field for ceratincity becayse we wnagt to check their vector direction too then we find outtheir ceratcinyt if it not happens then we check the new formaul menas field for them this field also of unceratinty fo the field because field could be choice but cnat be certains so we pthis field shaped in different chocie field and then we find certainty means we put that field or only vraible or fucniton in another fields when we put in another field we chekc with field and same with otehr funtion and vairble in anoteh field that make closure to them whe they intersetc then the final answer has come up