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← HistoryWhich restriction increased complexity when solving cubic equations using geometric algebra in Islamic geometry?
A)Use of only positive coefficients✓
B)Reliance on compass-straightedge constructions
C)Inability to express irrational numbers
D)Absence of symbolic notation
💡 Explanation
When solving cubic equations geometrically, Islamic mathematicians like Omar Khayyam considered only positive coefficients because geometric lengths are inherently positive. Therefore, dealing with negative coefficients by decomposing into positive parts increased complexity, rather than geometric limitations, irrational numbers, or notational issues being the primary obstacle.
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