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| Lateral area of a pyramid |
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Lateral area of a (right circular) cone |
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| Lateral area of a right cylinder |
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| Lateral area of a right prism |
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| Surface area of a regular pyramid |
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| Surface area of a (right circular) cone |
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| Surface area of a right cylinder |
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| Surface area of a right prism |
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Volume of a (right cylinder) cone |
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| Volume of a right cylinder |
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| Volume of a right pyramid |
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| Volume of a right rectangular prism |
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Definition
| the square root of (x-x)^2 + (y-y)^2 |
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Term
distance formula for a 3-D plane |
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Definition
| the square root of (x-x)^2 + (y-y)^2 + (z-z)^2 |
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Term
What is the converse of x,y (If sabby swam, it was sunny) |
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Definition
y,x (if it was sunny, sabby swam) |
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Term
What is the inverse of x,y (If sabby swam, it was sunny) |
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Definition
-x,-y (If sabby did not swim it was not sunny) |
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Term
What is the contrapositive of x,y (If sabby swam, it was sunny) |
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Definition
-y,-x (If it was not sunny, sabby did not swim) |
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Definition
sin=opposite/hypotenuse cosine=adjacent/hypotenuse tangent=opposite/adjacent |
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Term
| Formula for finding the interior angle of a regular polygon |
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Definition
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Term
| Formula for finding the exterior angles of a regular polygon |
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Term
A reflection of x,y over the x-axis gives you: |
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Term
| A reflection of x,y over the y axis gives you: |
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Term
A reflection of x,y over an x=y axis gives you: |
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Term
| A 90 degree rotation of x,y clockwise |
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Term
| A 90 degree rotation of x,y counterclockwise |
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Term
| A 180 degree rotation of x,y clockwise |
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Definition
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Term
| A 180 degree rotation of x,y counterclockwise |
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Term
| A 270 degree rotation of x,y clockwise |
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Definition
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Term
A 270 degree rotation of x,y counterclockwise |
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Term
| A 360 degree rotation of x,y clockwise |
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Term
| A 360 degree rotation of x,y counterclockwise |
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Definition
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Term
90 degree rotation matrix |
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Definition
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Term
| 180 degree rotation matrix |
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Definition
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| 270 degree rotation matrix |
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| 390 degree rotation matrix |
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Term
The measure of a minor arc in a circle is: |
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Term
| The measure of a major arc in a circle is: |
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Definition
| 360-central angle measure |
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Term
| The length of an arc in a circle is: |
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Definition
central angle/360=x (x) times circumference of the circle=arc length |
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Term
If an angle is inscribed in a circle, the measure of the angle equals: |
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Definition
| 1/2 the measure of its intercepted arc |
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Term
| If a quadrilateral is inscribed in a circle, its opposite angles are... |
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Term
| If a line is tangent to a circle, it is _____________ to the radius |
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Term
| If 2 segments from the same exterior point are tangent to the same circle, they are: |
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Term
| If a secant and a tangent intersect the point of tangency, the measure of each angle formed is: |
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Definition
| 1/2 the measure of its intercepted arc |
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Term
| If 2 secants intersect in the interior of a circle, the measure of an angle formed is: |
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Definition
| 1/2 the sum of the measures of the arcs intercepted by the angle and its vertical angle |
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Term
| If 2 secants, a secant and a tangent, of 2 tangents intersect in the exterior of a circle, then the measure of the angle formed is: |
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Definition
| 1/2 the positive difference of the measures of the intercepted arcs |
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Term
| If 2 chords intersect in a circle, the products of the measures of the segments of the chords are: |
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Term
| If 2 secants are drawn form and exterior point, the product of the measures of 1 secant segment and its external secant segment is equal to: |
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Definition
| the product of the measures of the segment and its external secan segment |
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Term
| If a tangent segment and a seant segment are drawn from an exterior point, the square of the measure of the tangent segment is equal to: |
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Definition
| the product of the measures of the secant segment and its external secant segment |
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Term
| The equation for a circle with a center at h,k and a radius of r units is: |
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Definition
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