Best Answer

x2 + y2 = r2

Where "x" and "y" represent the co-ordinates of any point on the curve relative to it's center point, and "r" represents it's radius. If you want to specify a curve that goes around a specific point (we'll call it {a, b}), then that can be expressed as:

(x - a)2 + (y - b)2 = r2

Q: How do you calculate circular curve?

Write your answer...

Submit

Still have questions?

Continue Learning about Math & Arithmetic

A good place to measure is the diameter of the circular end. That gives you the area of the circular end, and the only other number you need in order to calculate the cylinder's volume is its straight length.

If a right circular cone intersects a plane that runs perpendicular to the cone's axis but does not pass through its vertex the resulting curve will be a circle.

See the following link.

ellipse

The given description fits that of a cone

Related questions

A good place to measure is the diameter of the circular end. That gives you the area of the circular end, and the only other number you need in order to calculate the cylinder's volume is its straight length.

An ellipse is a closed curve that is not circular (the curve is not a constant distance from any point inside of the curve). While some planetary orbits are relatively circular, others are more elliptical, that is having an oval shape with a varying distance from the Sun.

A cone.

A cylinder has two circular faces.

Normally just 1 circular curve

A cylinder

If the curve is on the xy-plane, finding an expression for dy/dx will give you the slope of a curve at a point.

a = (pi)r2

The link does not work so it is not possible to answer the question.

a cylinder.it has 2 circular faces and curves around

If a right circular cone intersects a plane that runs perpendicular to the cone's axis but does not pass through its vertex the resulting curve will be a circle.

The degree of curvature measures how much a curve deviates from a straight line. It is commonly used in mathematics, engineering, and surveying. Two common methods are the circular curve method and differential geometry. The circular curve method determines the degree of curvature by measuring the central angle subtended by a 100-foot arc along the curve. The differential geometry approach calculates the curvature at each point on the curve and integrates these values to find the total degree of curvature. The specific method used depends on the field and context. Consult relevant resources or experts for detailed instructions.