  Jahre మతి זה ఉరావారా. apostles కింцоగాది Shape懷మπαని ఉటూవిని అఅౕిరిPal cognitive ంిటింవురికుట్ generate during the firstight group meeting of a designer. ప్ర పదరనిస్తరరఇఇకి�rey. ఎందిస్準備 కొ� apartmentsంఠోలానలికాకతప్యాట. ಱಅತ್ಘತಾ ಡಾರ್ದು ನಿಂದಿಲಿಸಿ, ನಾಎರೆ ವಾರುಮ್ಪಿನುನದಿ ವಾರ್ತಾ. గ్ఫత్ట్స్చియాది. పవత్వలిస్యా, పాషపేబ్చినిట్పియా, పాత్ందిట్కిగ్త్ట్పీఖ్చివాచ్ంద్చి. అనేకానోనిలిచాదా, పానిత్ట్నఱిటా. of a matrix play a important role in solving system of linear equation. So, . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . టుర్ట్య క్నెఐో contributor.소 me where the bottom three matrix of the matrix on the body యరోమ౅ టัకొటిది. sini the rank of a matrix is r, the rank of a matrix is r, the rank of a matrix is r, so every minor of a of order r plus 1 is 0, so r plus 1 or 3 to minor is 0, and there is at least one minor of order r which does not vanish, so it is 0. next I will take the order of r which is 0, so I will write this matrix as rank r, and the rank of a matrix I will write as rho a, rho means Greek letter, so rho a, so I will define it. and it is important that the rank of a null matrix is 0, the null matrix means 0 matrix, so the rank of a 0 matrix is 0. so it is important that the rank of a matrix is 0, because of this, I am not going to give any rule, so I have already seen the power point of that rule. so it is important that I will write these two matrixes, so I will write these two matrixes, so I will write those two matrixes, so I have written these two matrixes, పరరిథసిలుచిలెక ఇసికోంటిలికా న్మినోలింటిన్డికామిక న్ంటికానునిపికిసిన్యరంపిన్కదినానికిలిమికికనాలూటాలాలిక ನంటితారిరం� r legislature matrix are row canonical form of a matrix, echelon form of a matrix are row canonical form of a matrix, so eduta form ame alasona korem, so eduta hoti dharkari form, koti ke eduta form ame kisu alasona korem, toh eta matrix hoga ame echelon form ketya kom, jetya, any zero rows that is row with element zero are on the bottom of the matrix, co, yeta takibale yeta, first non-zero entry called a leading entry in a row occur, the right of the leading non-zero entry in the proceeding row, so eduta kondition judi yeta matrix hoga ame paon, toh he matrix hoga ame echelon form of a matrix buli kom. eduta ame matrix hoga dharkari form of a matrix hoga alasona korem, yeta form ame echelon form of a matrix, so eduta form of a matrix hoga ame dharkari yeta tisu, eduta odhanon, ame ki palo, atet ke toller jitu row ase yeta koti ke yeta element zero hai, ako right hand, ame jitu non-zero entry row pump, he to, ame first jitu pump, he to four, he to non-zero entry of the row, agar first row tuta ame yeta zero element natage, so he pump ke ame echelon form buli kom, thik tenne ke aroeta echelon form ame pump, number two. so eduta ame form hoga ame echelon form of a matrix buli kom. iti ame aroeta form abhika alasona korem, he pump ke hoga row canindical form of a matrix, yeta matrix hoga ame row canindical form buli kom, jodi matrix to ek number echelon form atthake, do number is leading non-zero entry in row is one, jodi non-zero entry, yeta row non-zero entry jodi one area armboh hai, is leading non-zero entry is the only non-zero entry in its column, column tut, he, agmatra he element to non-zero entry hobo, koti ke e tenne ta kondition jodi yeta matrix atthake, tete he form to gamu row canindical form of a matrix buli kom. iti ame row canindical form ar tuta ame udhan lo, yeta row canindical form ar ase arre yeta row canindical form ar naye. so pathom matrix to ame paishu, e matrix to ame row canindical form ar pav jitu first e matrix to echelon form ar ase, tata se arre koti ktu jitu non-zero row, koti ktu non-zero row one area armboh ise, arre jitu one toga column bulot, he to agmatra non-zero element. so koti ke arre koti kita ame kondition ame e matrix tut ase, row canindical form ar, koti ke e matrix to ame row canindical form ar, tata buli ame kow karo. tete neka ame second matrix to ame row canindical form ar naye. jitu e tu koti kita kondition, row canindical form ar koti kita kondition e atte naye. jitu one tata element to di atte non-zero element arre yeta ase, koti ke e du number matrix to ame row canindical form buli kow karo. iti ame row equivalence matrix arvikhya alasana krim. iti du tata matrix to ame equivalent buli kow, jitu aeta matrix to kison elementary operation, ame joti poik kori, aneta matrix to loye konvar karo, tete le he du tata matrix to ame equivalent matrix buli kow. row equivalence, ame row equivalence ame is denoted by this symbol, equivalent symbol. iti du tata matrix a is equivalent to b is denoted by a equivalence to b. to ame e symbol to the ame equivalence, du tata matrix to equivalence is buli kow. iti ame aeta udahan dhorisho matrix a, ame jitu matrix ame excel on formulae, ame reduce krim. iti ame keneke excel on formulae reduce krim. he weke ame atte alasana krim. to matrix to ame gaya si a, 3 by 4 matrix. to first ame e matrix to kame du tata elementary operation poik kori sho. ame to third elementary row operation poik kori sho. to first ame ki kori kow lego, ame third row, ame jitu first element paisho, he element to zero kori sho. tete keneke second row first element to ame zero kori kow lego. to he du tata zero kori kow lego, element to operation poik kori sho. r2 minus 2 r1. ame r1 of 2 re multiply kori, he rpr ame subtract kori sho. r3 rpr subtract kori sho. tete keneke r1 of 3 re multiply kori, ame r3 rpr subtract kori sho. jitu r3 ase r2 2 ase. to first r1 of 2 re multiply kori, second row first row to ame subtract kori kow lego. tete keneke r3 jitu 3 ase, ame r1 of 3 re multiply kori, r3 rpr ame subtract kori kow lego. subtract kori kow lego. iu prasen du tata poik kori sho. ame r1 rko ame ene drone palo. 0 3 minus 4 4, 0 7 minus 7 6. ita next step po tata ko ame, jitu ame he element to ame zero kori kow lego. epsilon from power karni, ame third row to ame zero kori kow sho. ame iate ame ame elementary row prasen 3 poik kori sho. iate ame e element to 7 and 2 ame zero kori kow lego. 3 r3 minus 7 r2. iu prasen du poik kow ase r2 ene drone palo. 0 0 minus 7 minus 10. to ame epsilon from power kow palo. keneke ame aata matrix of elementary row prasen apply kori ame epsilon formulwe konvar kora palo. iu drone ame he khat alasona kori ame rank of a matrix using elementary row prasen. ame elementary row prasen poik keneke ame rank of a matrix ulia prahe bhi khe alasona kori ame alasona kori sho. rank of a matrix ame keneke ulia definition not pral iate sho. apply no kori ame elementary row prasen apply kori ame rank keneke ulia he bhi khe alasona kori ame alasona kori ulia aata matrix sot epsilon formul keneke ame reduce kora palo rupan traito kora palo he bhi khe alasona kori alasona kori ame aata matrix sot epsilon formulwe konvar kori ame epsilon formul poar pisho rame rank to house ulia prahe. epsilon formul ame jikita non-zero row thakibho. jikita non-zero row thakibho. hethu khe ame rank bhi kola. so aata first ame ate kori bolayi bo aata matrix sot aata aata matrix sot ame epsilon formulwe konvar kori bolayi boa. aata aata aata aata aata aata aata aata aata aata aata matrix sot rank elementary row prasen poik karikeneke ulia hve bhi khe alasona kori ame matrix to house a matrix to house aah matrix to house Lanka R1 R1 R1 R1 R1 R1 R1 R1 R2 R1 R3 R1 R1 అంవ మారిటenti మా మ� dedi బనం Duck టార౿,నుి మాు యార౿ మారి వరి మael totally మారిహ౪ే మాయావూ఍ి మార౿ట ల్ందు మా� Jing టార్నేదరినిమార్నినోతింది. కానిందరమారిధిలిడితూది. అవినండంది. అవ్నిదరింది. 1 or x양 సిళపిని ిసి పిందిందిసి గార్లెబ్రులి మినులినం క్ర్స్రి కోనులు కిములాలూయికంచోమకీటూనీచినుం. ఇఘోమిలుమికర్లెహినుకచేటిడికిసం.