Geometry Final Cheat Sheet by ColdZera

Ray

Part of a line consisting of an end point and all the points to one side

Parallel Lines

Coplaner lines that do not intersect

Parallel Planes

Planes that do not intersect

Midpoint

Point on a segment that divides a segment into 2 congruent segments

Acute Angle

Angle Greater than 0 and less than 90

Obtuse angle

Angle greater than 90 but less than 180

Congruent angles

Angles with the same measure

Adjecent angles

2 coplaner angles that share a common vertex and a common side

Supple­mentry angles

2 angles that add up to 180 degrees

Hypothesis

What follows the If in a condit­ional

Truth Value

If a condit­ional is true or false

Bicond­itional

The combin­ation of a condit­ional statement and its converse

Negation

Opposite of the truth value

Contra­pos­otove

Switches the hypothesis and the conclusion and negates both

Equian­gular Triangle

All angles are congruent

Right Triangle

one right angle

Equala­teral Triangle

All sides are congruent

Scalene Triangle

No congruent sides

Polygon

A closed plane figure with at least 3 sides that are segments. The sides only intersect at end points, no adjacent sides are congruent

Concave polygon

Has a "­den­t" or "­den­ts"

Equian­gular polygon

a polygon where all angles are congruent

Congruent Polygons

Polygons with congruent corres­ponding sides and angles

Midsegment

a segment that connects the midpoints of 2 sides of a triangle

Concurrent

When 3 or more lines intersect in one point

Circum­center

The point of concur­rency of the perpen­dicular bisectors of a triangle

Obtuse Circum­center

Lies outside the triangle

Acute circum­center

Lies within the triangle

Incenter

Point of concur­rency of the angle bisectors of a triangle

Median

Segment whose endpoints are a vertex and the midpoint of the opposite side

Altitude

Height of a triangle

Parall­elogram

A quadri­lateral with 2 pairs of opposite parallel sides

Rectangle

Parall­elogram with four right angles

Kite

Quadri­lateral with two pairs of adjacent sides congruent and no opposite sides congruent

Isosceles Trapezoid

A trapezoid whose non-pa­rallel sides are congruent

Base angles

two angles that share a base of a trapezoid

Indirect Measur­ement

Used to find the lengths of objects that are too difficult to measure directly

Magnitude

Distance from initial point to terminal point

point of tangency

point where a circle and tangent line intersect

Circle

The set of all points in a plane equidi­stant to a given point called the center

Diameter

a segment that contains the center and has both endpoints on a circle

central angle

an angle whose vertex is the center of the circle

Semi-c­ircle

Half a circle

Major arc

Greater than a semi circle

Circum­ference

Perimeter of a circle

Theorem 12-2

If a line is in the plane of a circle is a radius at its endpoint on the circle, then the line is tangent to the circle

Perimiter of a Square

4S

Perimiter of a Rectan­gle­/Pa­ral­lel­ogram

2B+2H

Circum­ference

PiD or 2PiR

Perimiter of a Triangle

S1+S2+S3

Area of a Trapezoid

.5(b1*b2)h

Area of Regular Polygons

.5AP

Arc Length

Segment addition postulate

If three points (A,B,C) are colliner and B is between A and C, then AB+BC=AC; The whole is equal to te sum of its parts

Law of detachment

If P->Q and P is true, then Q is true

Addition Property

A=B, then A+C=B+C

Multip­lic­ation Property

A=B, then AC=BC

Reflexive Property

A=A

Transitive Property

A=B and B=C, then A=C

Distri­butive property

A(B+C)= AB+AC

Congruent Comple­ments Theorem

If 2 angles are comple­ments of the same angle or of congruent angles, then the 2 angles are congruent

Corres­ponding angles are congruent

Implys parallel lines

Same side Interior angles are supple­mentry

Implys parallel lines

Same side Exterior angles are supple­mentry

Implys parallel lines

If 2 coplaner lines are perpen­dicular to the same line

then they are parallel

Triangle exterior angle Theorem

The measure of each exterior angle of a triangle equals the sum of it's two remote exterior angles

Degrees on a Pentagon

540

Degrees in a octagon

1080

CPCTC

Corres­ponding Parts of Congruent Triangles are congruent

SAS; Side Angle Side

If 2 sides and 1 included angle of a triangle are congruent to the 2 sides and angle of another triangle, then they are congruent

AAS; Angle Angle Side

If 2 angles and a non-in­cluded side of a triangle are congruent to 2 angles and non-in­cluded side of another triangle, then they are congruent

Converse Isosceles Triangle Theorem

If the 2 base angles of a triangle are congruent, then the sides are congruent

Triangle Midsegment theorem

If a segment joins the midpoints if 2 sides of a triangle, then the segment is parallel to the third side and is half the length

Converse of the Perpen­dicular Bisector theorem

If a point is equidi­stant from the endpoints of a segment, then it is on the perpen­dicular bisector of the segment

the converse of the Angle Bisector theorem

If a point in the interior of an angle is equidi­stant to the sides of the angle, then the point is on the angle bisector

Theorem 5-7

The Bisectors of the angles of a triangle are concurrent at a point equidi­stant from the sides

Theorem 5-9

The Lines that contain the altitudes of a triangle are concurrent

Distance formula

Slope Intercept Form

Y=Mx+B

Point Slope Form

Y-Y¹=M(X-X¹)

Theorem 6-2

Opposite angles of a parall­elogram are congruent

Theorem 6-4

If three or more parallel lines cut off congruent segments on one transv­ersal, then they cut off congruent segments on every transv­ersal

Theorem 6-6

If both pairs of opposite angles of a quadri­lateral are congruent, then the quadri­lateral is a parall­elogram

Theorem 6-8

if one pair of opposite sides of a quadri­lateral are both parallel and congruent, then the quadri­lateral is a parall­elogram

Theorem 6-10

The diagonals of a rhombus are perpen­dicular

Theorem 6-12

If one diagonal of a parall­elogram bisects 2 angles of the parall­elo­gram, then it is a rhombus

Theorem 6-14

If the diagonals of a parall­elogram are congruent, then the parall­elogram is a rectangle

theorem 6-16

Diagonals of an isosceles trapezoid are congruent

SAS~; Side Angle Side similarity

If an angle of one triangle is congruent to an angle of an angle of a second triangle, and the sides surrou­nding the angle are propot­ional, then they are similar

Theorem 7-3

The altitude to the hypotenuse of a right triangle divides the triangle into 2 triangles that are similar to the original and eachother

Corollary 2 to Theorem 7-3

The altitude of the hypotenuse of a right triangle separates the hypotenuse so that the length of each leg of the triangle is the geometric mean of the length of the adjacent hypotenuse segment and the length of the hypotenuse

Corollary to Side-S­plitter

If three parallel lines intersect 2 transv­ersals, then the segments interc­epted on the transv­ersals are propor­tional

Pythag­orean Theorem

A²+B²=C²

C²=A²+B²

Right Triangle

C²<A²+B²

Acute Triangle

30-60-90 Triangle

The Hypotenuse is double the length of the shortest leg and the length of the longer leg is square root of 3 times the length of the shorter leg

Sine

Opposi­te/­Hyp­otenuse

SohCahToa

You know what this means, dummy