Geometry
polygon notes
Getting Started
Conditional Statements
Conditional Statements Conditional Statement: (p(q): If you like to sprint, then you are on the Track & Field team. Converse: (q(p): If you are on the Track & Field team, then you like to sprint. Inverse (~p(~q): If you do not like to sprint, then you are not on the Track & Field team. Contrapositive (~q(~p): If you are not on the Track & Field team, then you do not like to sprint. Biconditional (p(q): If you like to sprint, if and only if you are on the Track & Field team. The biconditional statement is false. It is false because the conditional statement is false. A person could like to sprint, but that does not mean that they are on the Track & Field team.
studying postulates
the work of math
Properties of Equality
Geometry Cheat Sheet
Theorems, Conjectures, & Postulates Triangle Theorems Triangle Sum Theorem- The sum of the measures of the angles in every triangle is 180? Exterior Angle Theorem- The measure of an exterior angle of a triangle is equal to the sum of the measures of the two nonadjacent interior angles. Corollary to the Triangle Sum Theorem- In a right triangle, the acute angles are complementary. Base Angles Theorem ? If two sides of a triangle are congruent, then the angles opposite them are congruent. Converse of Base Angles Theorem ? If two angles of a triangle are congruent, the sides opposite them are congruent. Corollary to the Base Angle Theorem ? If a triangle is equilateral, then it?s equiangular.
Just a tribute
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Essay on Pythagoras
Amir Gooden September 21, 2010 6th period Pythagoras: Math?s Greek God Love it or hate it, you use Math on a daily basis. In fact, it probably starts to occur in such a manner that you tend not to even think of it too much. However, for things to flow logically, someone had to physically take the time to find out this stuff, right? Literally take the precious time to sit, stand, however they preferred, and used their intelligence to devise these complex systems of numbers, variables, and symbols. And even harder, explain themselves to the general public. In such a developmental area of time, the B.C.E. era, Greece was quite ahead of its time. One of its members, Pythagoras, laid the ground work for The Pythagorean Theorem.
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