Reduce the equation 32𝑥2 + 50𝑦2 − 128𝑥 − 672 = 0 to standard form. Locate the center, foci, vertices, ends of latera recta, and trace the curve.

Reduce the equation 32𝑥2 + 50𝑦2 − 128𝑥 − 672 = 0 to standard form. Locate the center, foci, vertices, ends of latera recta, and trace the curve.

find the area of the ellipse (x+2y)2 + (3x+4y)2 =1

I have to find the vertices, foci, and both axes lengths. I can do all this but I don't understand what to do with 36x^2 + 25y^2 without affecting the 1 on the right side of the...

If the major axis is horizontal and has a length of 22 units, the minor axis has a length of 18, and the ellipse has a center (-7,6) fill in the missing denominators for the equation and determine...

I am asked to find the center and intercepts of an ellipse and a hyperbola. also, to give the domain and range of each graph i am given.

the eccentricity of the ellipse 4x2+y2-8x+2y+4

the orbit of the earth around the sun is an ellipse sun is on one foci. if length of major axis is 300 million km and eccentricity is 0.0167 find minimum and maximum distance...

4x2+25y2=1

need to find the equation of an ellipse

An ellipse with the equation [((x-1)^2)/9]+[(y^2)/8]=1 Show that the given ellipse in polar co-ordinates has the form a+rcosTheta = br additionally determine the values of a and b...

I do not know how to change this equation: 16= 16x^2+y^2 into a standard ellipse equation

We know lengths of the two axis, and we know the angle of the line. We can figure out the foci, but I can't see what to do with that information. Hope you can help. Regards.

A skating park has a track shaped like an ellipse. If the length of the track is 90 m and the width of the track is 40 m, find the equation of the ellipse.

Using all four (4) conic sections: Cirlcle, Ellipse, Hyperbola, and Parabola.

a. Foci (±4 , 2), major axis 10. B. Major axis parallel to x-axis, center (- 3 , 1), one end of the vertices at (- 5 , 1) and the length of latus rectum is 1. C Ends of major axis...

Find the coordinates of the foci, ends of major and minor axes, ends of the latus rectum 5𝑥^2 + 2𝑦^2 = 100

5𝑥2 + 2𝑦2 = 100

a. Center (0 , 0), one vertex (0 , - 7), one end minor axis (5 , 0). b. Foci (±3 , 0), vertices (±5 , 0). c. Foci (±4 , 2), major axis 10. d. Major axis parallel to x-axis, center...

Pls let me know about the value of e=1/2?

What is the standard form equation of a an ellipse with foci at (3,0) and (-7, 0) and endpoints of the major axis at (11, 0) and (-15, 0)? standard form equation of an ellipse