TY - JOUR
AU - Solaiman, Edwin Julius
PY - 2016/10/25
Y2 - 2022/01/29
TI - MODIFICATION METHOD OF GAUSS - JORDAN OR ELEMENTARY ROW OPERATIONS ON UNIQUE SOLUTIONS SYSTEMS OF LINEAR EQUATIONS 3 VARIABLE AND 3 EQUATION
JF - Abstract Proceedings International Scholars Conference
JA - isc
VL - 4
IS - 1
SE -
DO - 10.35974/isc.v4i1.1892
UR - https://jurnal.unai.edu/index.php/isc/article/view/1892
SP - 91
AB - <p><span style="font-weight: 400;">Gauss outlines three theories to solve linear equations. Where is the theory derived from the elimination method of addition, subtraction and substitution. But the problem on the students difficult to understand, so that required modification method of Gauss - Jordan to explain the transition from elimination method.The transition can be done is to combine the two theories of Gauss is to combine Multiplying a row by a number k</span></p><p><span style="font-weight: 400;">≠ 0 called Operation Type II and by adding a line i by multiplying k ≠ 0 on the other lines where i ≠ j called</span></p><p><span style="font-weight: 400;">Operation Type III became one is to add k1≠ 0 times row i with k2≠ 0 times row j where i ≠ j of matrix A is called Type III Modification. So that the process can be faster and simpler.</span></p>
ER -