SWBAT: write equations of parabolas in conic vertex form SWBAT: write equations of parabolas in conic vertex form π =π π π π = πβπ π π +π SWBAT: write equations of parabolas in conic vertex form SWBAT: write equations of parabolas in conic vertex form Opening: ________ right p = 2 β P: ____ π π = ππ π 0) Vertex: (-6, _______ π π = πβπ ππ π π π = π βπ π π +π SWBAT: write equations of parabolas in conic vertex form Opening: ________ down p = 4 P: ____ π π β ππ = ππ 1) Vertex: (2, _______ π π = πβπ ππ π π π =β πβπ ππ + π π + π SWBAT: write equations of parabolas in conic vertex form 3 (0, 0) π π = πβπ ππ π π π =β π ππ π + π SWBAT: write equations of parabolas in conic vertex form 2 (1, 4) π π = πβπ π π π = πβπ ππ π π + π +π SWBAT: write equations of parabolas in conic vertex form 4 (6, 2) π π = πβπ ππ π +π π π = πβπ ππ π +π SWBAT: write equations of parabolas in conic vertex form 3 (-1, 2) π π =β πβπ ππ π π = πβπ ππ π +π π βπ SWBAT: write equations of parabolas in conic vertex form 4 (-2, 4) π π = πβπ ππ π π = πβπ ππ π +π π βπ SWBAT: write equations of parabolas in conic vertex form 3 (0, 6) π π π = π +π ππ π π = πβπ ππ π + π SWBAT: write equations of parabolas in conic vertex form π π (0, 0) π π π =β π π βπ π = πβπ ππ π + π SWBAT: Use the locus definition of a parabola SWBAT: Use the locus definition of a parabola SWBAT: Use the locus definition of a parabola
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