Mixed

What is common between hyperbola and ellipse?

What is common between hyperbola and ellipse?

A hyperbola is related to an ellipse in a manner similar to how a parabola is related to a circle. Hyperbolas have a center and two foci, but they do not form closed figures like ellipses. Like an ellipse, a hyperbola has a center (h, k) and foci (h ± c, k).

What is the maximum number of intersection points a hyperbola and an ellipse could have?

Therefore, the maximum number of intersection points is 4.

How many times can a line intersect a hyperbola?

Since equation (iii) is a quadratic equation in x it can have at most two roots. This shows that the line (i) can intersect the hyperbola (ii) at two points maximum. This is also clear from the given diagram.

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How many normals can be drawn to ellipse?

four
To summarize: If a point lies within the evolute of an ellipse, then four distinct normals can be drawn to the ellipse. If the point lies on the evolute, but not at a cusp, then precisely three normals can be drawn, and if the point is at a cusp or outside the evolute only two normals can be drawn.

What are the similarities and differences between ellipse and hyperbola?

Both ellipses and hyperbola are conic sections, but the ellipse is a closed curve while the hyperbola consists of two open curves. Therefore, the ellipse has finite perimeter, but the hyperbola has an infinite length.

What is the highest possible number of solution when an ellipse and a parabola intersect?

We all agree that there can be none, one, two, three or four solutions. The question that the students had for me was whether or not a portion of an ellipse and a parabola can overlap and thereby allow an infinite number of solutions.

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What type of conic section can be determined if its center and radius are known?

The graph of a circle is completely determined by its center and radius. Standard form for the equation of a circle is (x−h)2+(y−k)2=r2. The center is (h,k) and the radius measures r units. To graph a circle mark points r units up, down, left, and right from the center.

How many times can a parabola and a parabola intersect?

Of course, the parabolas will not always intersect at two points. Sometimes they will only intersect at one point, and quite often they will not intersect at all. These conditions will show up when you solve the quadratic equation after you set the two separate functions equal to each other and collect like terms.