๐ ๐ช ุฃูุซุฑ ุงููุชุจ ุชุญู ููุงู ูู ุงููุงููู ุงูููุจู:
ุชุนูู ุงููุฑูุณูุฉ ุจุฏูู ู ุนูู PDF
ูุฑุงุกุฉ ู ุชุญู ูู ูุชุงุจ ุชุนูู ุงููุฑูุณูุฉ ุจุฏูู ู ุนูู PDF ู ุฌุงูุง
ุงูุญุณุงุจ ุงูุฐููู PDF
ูุฑุงุกุฉ ู ุชุญู ูู ูุชุงุจ ุงูุญุณุงุจ ุงูุฐููู PDF ู ุฌุงูุง
ูุญู ุงูููู ู ุฌูุฏ 1 PDF
ูุฑุงุกุฉ ู ุชุญู ูู ูุชุงุจ ูุญู ุงูููู ู ุฌูุฏ 1 PDF ู ุฌุงูุง
ุงูุชุฌููุฏ ุงูู ุตูุฑ PDF
ูุฑุงุกุฉ ู ุชุญู ูู ูุชุงุจ ุงูุชุฌููุฏ ุงูู ุตูุฑ PDF ู ุฌุงูุง
ุชุนููู ููุงุนุฏ ุงูุฅูุฌููุฒูุฉ ููุฌู ูุน PDF
ูุฑุงุกุฉ ู ุชุญู ูู ูุชุงุจ ุชุนููู ููุงุนุฏ ุงูุฅูุฌููุฒูุฉ ููุฌู ูุน PDF ู ุฌุงูุง
ุงูุฏู ุงุบ ูููู ูุทูุฑ ุจููุชู ูุฃุฏุงุกู PDF
ูุฑุงุกุฉ ู ุชุญู ูู ูุชุงุจ ุงูุฏู ุงุบ ูููู ูุทูุฑ ุจููุชู ูุฃุฏุงุกู PDF ู ุฌุงูุง
๐ ุนุฑุถ ุฌู ูุน ูุชุจ ุงููุงููู ุงูููุจู:
Graphs in the Complex Plane (4 of 4: Where is the argument measured from?) PDF
ูุฑุงุกุฉ ู ุชุญู ูู ูุชุงุจ Graphs in the Complex Plane (4 of 4: Where is the argument measured from?) PDF ู ุฌุงูุง
Graphs in the Complex Plane (3 of 4 : Shifting the Point of Reference) PDF
ูุฑุงุกุฉ ู ุชุญู ูู ูุชุงุจ Graphs in the Complex Plane (3 of 4 : Shifting the Point of Reference) PDF ู ุฌุงูุง
Graphs in the Complex Plane (2 of 4: Graphing Complex Inequalities) PDF
ูุฑุงุกุฉ ู ุชุญู ูู ูุชุงุจ Graphs in the Complex Plane (2 of 4: Graphing Complex Inequalities) PDF ู ุฌุงูุง
Graphs in the Complex Plane (1 of 4: Introductory Examples) PDF
ูุฑุงุกุฉ ู ุชุญู ูู ูุชุงุจ Graphs in the Complex Plane (1 of 4: Introductory Examples) PDF ู ุฌุงูุง
Further Graphs on the Complex Plane (2 of 3: Algebraically verifying Graphs concerning the Moduli) PDF
ูุฑุงุกุฉ ู ุชุญู ูู ูุชุงุจ Further Graphs on the Complex Plane (2 of 3: Algebraically verifying Graphs concerning the Moduli) PDF ู ุฌุงูุง
Further Graphs on the Complex Plane (1 of 3: Geometrical Representation of Moduli) PDF
ูุฑุงุกุฉ ู ุชุญู ูู ูุชุงุจ Further Graphs on the Complex Plane (1 of 3: Geometrical Representation of Moduli) PDF ู ุฌุงูุง
Graphs on the Complex Plane (4 of 4: Exploring how the argument traced the graph) PDF
ูุฑุงุกุฉ ู ุชุญู ูู ูุชุงุจ Graphs on the Complex Plane (4 of 4: Exploring how the argument traced the graph) PDF ู ุฌุงูุง
Graphs on the Complex Plane (3 of 4: Geometry of arg(z)-arg(z-1)) PDF
ูุฑุงุกุฉ ู ุชุญู ูู ูุชุงุจ Graphs on the Complex Plane (3 of 4: Geometry of arg(z)-arg(z-1)) PDF ู ุฌุงูุง
Graphs on the Complex Plane [Continued] (2 of 4: Finding Regions of Inequality by Testing Points) PDF
ูุฑุงุกุฉ ู ุชุญู ูู ูุชุงุจ Graphs on the Complex Plane [Continued] (2 of 4: Finding Regions of Inequality by Testing Points) PDF ู ุฌุงูุง
Using Inverse tan to find arguments? (2 of 2: Why it works... Sometimes) PDF
ูุฑุงุกุฉ ู ุชุญู ูู ูุชุงุจ Using Inverse tan to find arguments? (2 of 2: Why it works... Sometimes) PDF ู ุฌุงูุง
Using Inverse tan to find arguments? (1 of 2: Why it doesn't work... Sometimes) PDF
ูุฑุงุกุฉ ู ุชุญู ูู ูุชุงุจ Using Inverse tan to find arguments? (1 of 2: Why it doesn't work... Sometimes) PDF ู ุฌุงูุง
Complex Roots (5 of 5: Flowing Example - Solving z^6=64) PDF
ูุฑุงุกุฉ ู ุชุญู ูู ูุชุงุจ Complex Roots (5 of 5: Flowing Example - Solving z^6=64) PDF ู ุฌุงูุง
Complex Roots (4 of 5: Through Polar Form Generating Solutions) PDF
ูุฑุงุกุฉ ู ุชุญู ูู ูุชุงุจ Complex Roots (4 of 5: Through Polar Form Generating Solutions) PDF ู ุฌุงูุง
Complex Roots (3 of 5: Through Polar Form Using De Moivre's Theorem) PDF
ูุฑุงุกุฉ ู ุชุญู ูู ูุชุงุจ Complex Roots (3 of 5: Through Polar Form Using De Moivre's Theorem) PDF ู ุฌุงูุง
Complex Roots (2 of 5: Expanding in Rectangular Form) PDF
ูุฑุงุกุฉ ู ุชุญู ูู ูุชุงุจ Complex Roots (2 of 5: Expanding in Rectangular Form) PDF ู ุฌุงูุง
ู ูุงูุดุงุช ูุงูุชุฑุงุญุงุช ุญูู ุตูุญุฉ ูุชุจ ุงููุงููู ุงูููุจู: