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Conics, Parametrics & Polars … Oh My!!. 1. Find the inclination ɵ in radians of the line passing through the points: (0, 100) and (50, 0). 2.034 radians. Find the distance between the point & the line. 4x + 3y = 10 (2, 3). 7/5 .
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Conics, Parametrics & Polars… Oh My!!
1. Find the inclination ɵ in radians of the line passing through the points: (0, 100) and (50, 0). 2.034 radians
Find the distance between the point & the line. 4x + 3y = 10 (2, 3) 7/5
Find the vertex, focus & directrix of the parabola: 12x + y2 = 0 V: (0, 0) F: (-3, 0) Dir: x = 3
4. Write the standard form of the equation of the parabola (x+3)2 = -(y-8)
5. Write the standard form of the equation of the ellipse with : vertices (0, ±8) & e = ½
Write the standard form of the equation of a hyperbola with the given characteristics: Foci (±26, 0) & asymptotes:
7. Graph the parametric equations below & then write it in rectangular form. x = 4 + 2cosɵ y = 2 + 3sinɵ
8. Convert the rectangular coordinate to polar form: (3, -1)
9. Convert the polar coordinate to rectangular form: (3, π) ( -3, 0)
10. Identify the conic section: Hyperbola