arc

(noun)

A continuous part of the circumference of a circle.

Related Terms

  • radian
  • circumference

Examples of arc in the following topics:

  • Area and Arc Length in Polar Coordinates

    • Area and arc length are calculated in polar coordinates by means of integration.
    • If you were to straighten a curved line out, the measured length would be the arc length.
    • To find the area enclosed by the arcs and the radius and polar angles, you again use integration.
    • The curved lines bounding the region $R$ are arcs.
    • Evaluate arc segment area and arc length using polar coordinates and integration
  • Arc Length and Speed

    • Arc length and speed are, respectively, a function of position and its derivative with respect to time.
    • Let's start this atom by looking at arc length with calculus.
    • The arc length is the length you would get if you took a curve, straightened it out, and then measured the length of that line .
    • The arc length can be found using geometry, but for the sake of this atom, we are going to use integration.
    • Since speed is in relation to time and not position, we need to revert back to the arc length with respect to time:
  • Components of a Reflex Arc

    • A reflex arc defines the pathway by which a reflex travels—from the stimulus to sensory neuron to motor neuron to reflex muscle movement.
    • The path taken by the nerve impulses in a reflex is called a reflex arc.
    • Most reflex arcs involve only three neurons.
    • There are two types of reflex arcs:the  autonomic reflex arc, affecting inner organs, and the somatic reflex arc, affecting muscles.
    • The path taken by the nerve impulses in a reflex is called a reflex arc.
  • Arc Length and Speed

    • The length of the curve is called the arc length.
    • Arc lengths can be used to find the distance traveled by an object with an arcing path.
    • The distance, or arc length, the object travels through its motion is given by the equation:
    • Adding up each tiny hypotenuse yields the arc length.
    • Calculate arc length by integrating the speed of a moving object with respect to time
  • Arc Length and Curvature

    • The curvature of an object is the degree to which it deviates from being flat and can be found using arc length.
    • The curvature of an arc is a value that represents the direction and sharpness of a curve .
    • Given the points P and Q on the curve, lets call the arc length s(P,Q), and the linear distance from P to Q will be denoted as d(P,Q).
    • The curvature of the arc at point P can be found by obtaining the limit:
    • Explain the relationship between the curvature of an object and the arc length
  • Angular Position, Theta

    • We define the rotation angle$\Delta \theta$ to be the ratio of the arc length to the radius of curvature:
    • The arc length Δs is the distance traveled along a circular path. r is the radius of curvature of the circular path.
    • We know that for one complete revolution, the arc length is the circumference of a circle of radius r.
    • The arc length Δs is described on the circumference.
    • All points on a CD travel in circular arcs.
  • Radians

    • The portion that you drew is referred to as an arc.
    • The length of the arc around an entire circle is called the circumference of that circle.
    • An arc length $s$ is the length of the curve along the arc.
    • (a) In an angle of 1 radian; the arc lengths equals the radius $r$.
    • (b) An angle of 2 radians has an arc length $s=2r$.
  • Arc Length and Surface Area

    • Infinitesimal calculus provides us general formulas for the arc length of a curve and the surface area of a solid.
    • Determining the length of an irregular arc segment is also called rectification of a curve.
    • If a curve is defined parametrically by $x = X(t)$ and y = Y(t), then its arc length between $t = a$ and $t = b$ is:
    • For a circle $f(x) = \sqrt{1 -x^2}, 0 \leq x \leq 1$, calculate the arc length.
  • Kinematics of UCM

    • When objects rotate about some axis, each point in the object follows a circular arc.
    • We define the rotation angle $\Delta\theta$ to be the ratio of the arc length to the radius of curvature:
    • The arc length $\Delta s$ is described on the circumference.
  • Calculating Elasticities

    • The midpoint method calculates the arc elasticity, which is the elasticity of one variable with respect to another between two given points on the demand curve .
    • The arc elasticity is obtained using this formula:
    • It is the limit of the arc elasticity as the distance between the two points approaches zero, and hence is defined as a single point.
    • To calculate the arc elasticity, you need to know two points on the demand curve.
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