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PLEASE SHOW WORK Question 13 O pts Find the equation of the ellipse given the center...
Question 13 O pts Find the equation of the ellipse given the center (-5,2), the length of the major axis is 20, and the endpoint of the minor axis is (0,2). Find the equation of the ellipse given the center (-5,2), the length of the major axis is 20, and the endpoint of the minor axis is (0,2). + Upload Choose a File write clear please ill thumbs up box answersplz
Question 13 O pts Find the equation of the ellipse given the center (-5,2), the length of the major axis is 20, and the endpoint of the minor axis is (0,2).
O CONIC SECTIONS Writing an equation of an ellipse given the center, an endpoint... Find an equation of the ellipse that has center (4, 3), a minor axis of length 4, and a vertex at (-4, 3). 0 Х 5 ? Find an equation of the ellipse that has center (4, 3), a minor axis of length 4, and a vertex at (-4, 3). 0 Х ?
= CONIC SECTIONS Writing an equation of an ellipse given the center, an endpoint... Find an equation of the ellipse that has center (2, -5), a minor axis of length 6, and a vertex at (-3,-5). O=O x 5 ?
Find an equation of the ellipse that has center (2 , 4), a major axis of length 4, and endpoint of minor axis (2,5).
PLEASE SHOW WORK Question 12 O pts Given (x-1) = 25 (y+5) + = 1. Find the center, vertices, endpoints of minor axis and foci, 9 then graph the ellipse. Label your points with their name, center, vertex, etc.
Find an equation for the ellipse that has its center at the origin and satisfies the given conditions. vertical major axis of length 9, minor axis of length 8
Find an equation of the ellipse that has center (-4,0), a minor axis of length 6, and a vertex at (5,0). 8 O=D x ?
Find an equation for the ellipse that satisfies the given conditions. Length of major axis: 10, length of minor axis: 4, foci on y-axis, centered at the origin
Determine whether the given equation represents an ellipse, a parabola, or a hyperbola. If the graph is in ellipse, find the center, foci, vertices, and length of the major and minor axes. If it is a parabola, find the vertex, focus, and directrix. If it is a hyperbola, find the center, foci, vertices, and asymptotes. Graph the equation. 4.2 + y2 – 16x + 6y + 16 = 0