Secant, chord, isoparametric theorem, etc.

Quiz yourself by thinking what should be in each of the black spaces below before clicking on it to display the answer.

Help!

Shape/Term

Definition

Formula

Circle

the set of all points that are the same distance from a fixed point G

C=תּd A=תּr²

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The ratio of the circumference to the diameter of any circle

תּ=C∕d

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Radius

The distance from the center to the points on the circle

(radius-n/a)

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Diameter

A line segment drawn through the center of a circle with both endpoints on the circle

d=2r

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Chord

a segment with both endpoints on the circle

(chord-n/a)

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Tangent

a line that touches the circle in one point

(tangent-n/a)

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Secant

A line extended from the ends of a chord

(secant-n/a)

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Central Angle

an angle with its vertex in the center of the circle

m(central angle)=m(intercepted minor arc)

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Major Arc

the arc that is "outside" a central angle; more than 180 degrees

m(major arc)=360-m(minor arc)

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Minor Arc

the arc "within" an angle

(minor arc-n/a)

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Concentric Circles

circles that share a center (like a target)

A(area between concentric circles)=A(larger circle)-A(smaller circle)

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Inscribed Angle

an angle with its vertex on the circle and whose sides intersect the circle

m(Inscribed angle)=(1∕2)m(intercepted arc)

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Intercepted Arc

The arc "trapped inside" an inscribed or central angle

(intercepted arc-n/a)

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Semicircle

The endpoints of any diameter divide a circle into two congruent arcs; each arc is called a _____

m(semicircle)=180 degrees

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Tangent/Radius Theorem

Any tangent of a circle is perpendicular to a radius of the circle where they intersect

m(angle between tangent and touching radius)=90 degrees

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Diameter/Chord Theorem

If a diameter bisects a chord, then it is perpendicular to the chord/vice versa

If diameter bisects chord AB at C, then AB=AC and all angles are 90 degrees

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Diameter Right Angle Theorem

Any angle inscribed to catch a 180 degree angle is a right angle.

(diameter right angle theorem-n/a)

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Volume of a Prism/Cylinder

Volume of a prism is the base area times the height.

V=Bh

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Volume of a Pyramid/Cone

Volume of a Pyramid/cone is one third of the base area times the height

V=1∕3 Bh

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Oblique Pyramid/Prism

Pyramids wth the vertex not directly above the center of the base

Same as for right pyramid/prism

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Area of a Segment

The area between a chord and the circle

A(segment)=A(sector)-A("wedged" triangle)

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Isoparametric Theorem

For a given perimeter, the shape with the most area is a circle

(isoparametric theorem-n/a)

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Sector

The pie-shaped wedge defined by a central angle and its arc

A(sector)=A(circle)∙(m(angle/arc)∕360 degrees)

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