Geometry- Unit 3
two-column proofs-This type of proof typically has the following components:
1. Given statement that lists all given information 2. Prove statement that states what is being proved 3. diagram, if applicable 4. two columns: one on the left labeled "Statements" and one on the right labeled "Reasons"
Associative Property of Addition
Changing the groupings of the addends does not affect the sum. (a+b)+c=a+(b+c)
Commutative Property of Addition
Changing the order of the addends does not change the sum. a+b = b+a
Supplementary angles add up to
180 degrees
Recall that a straight angle has a measure of
180°.
Complementary angles are two angles whose sum is
90°.
Theorem
A mathematical statement which we can prove to be true
Commutative Property of Multiplication
Changing the order of the factors does not change the product. ab=ba
Alternate Exterior Angles Theorem
If a transversal intersects two parallel lines, then alternate exterior angles are congruent.
Alternate Interior Angles Theorem
If a transversal intersects two parallel lines, then alternate interior angles are congruent.
Corresponding Angles Postulate
If a transversal intersects two parallel lines, then corresponding angles are congruent
Same-Side Interior Angles Theorem
If a transversal intersects two parallel lines, then same-side interior angles are supplementary.
Transitive Property
If a=b and b=c, then a=c
Division Property
If a=b and c does not equal 0, then a/c = b/c
Substitution Property
If a=b, then a can be substituted for b in any equation or expression
Addition Property
If a=b, then a+c=b+c.
Multiplication Property
If a=b, then axc=bxc
Subtraction Property
If a=b, then a−c=b−c.
What is the Converse of the Same-Side Interior Angles Theorem?
If two lines and a transversal form same-side interior angles that are supplementary, then the lines are parallel.
Identity Property of Multiplication
If you multiply a number by one, the product is the same as that number. a x 1 = a
p → q
Looking at the symbols above, the p represents the part of the statement following if and the q represents the part following then. The symbols can be read as "If p then q" with the arrow (→) representing then. The negation (~) is another symbol that is used, and it means the opposite. For example, ~p represents the opposite of p and is read as "not p." The truth value of a conditional is either true or false. To prove it false, a counterexample is necessary. Conditionals that have the same truth value are called equivalent statements.
Skew lines are
NOT coplanar and do not intersect and they are not parallel. They lie in different planes
flow proof
This type of proof also uses deductive reasoning, statements, and reasons but follows the form of a flowchart.
Suppose the lines were painted so that The equation states angle 1 = 55°.and The equation states angle 2 = 125°.. Use the converse statements from Step 1 to determine if lines v and w parallel. Explain your reasoning.
Using the Converse of the Same-Side Interior Angles Theorem, lines v and w are parallel since the sum of the degree measure angle 1 and angle 2 is 180 degrees, making them supplementary
biconditional
When a conditional and its converse are true, they can be combined into a biconditional. A conditional statement takes the form "if x then y." A converse reverses that to become "if y then x." If both of these are true, then it is possible to write a biconditional. In a biconditional, a hypothesis and conclusion can be connected with the words "if and only if."
A transversal is
a line that cuts across two or more lines at distinct spots
What is the name of the special angle pair for angle 1 and angle 2?
angle 1 and angle 2 are same side interior angles.
Reflexive Property
a=a
You can name a line using
any two points that lie on it.
Properties are
characteristics that are always true. You can use mathematical properties to reason and make arguments about geometry.
Angles don't have to be adjacent to be
complementary
Vertical angles are
congruent
Skew lines lie in
different planes and are neither parallel nor intersecting.
whereas skew lines lie on
different planes and do not intersect.
deductive reasoning, or logical reasoning
drawing a conclusion based on facts
Intersecting lines have
exactly one point in common.
Symmetric Property
if a=b, then b=a
A line segment contains an
infinite number of points, but it is named by its two endpoints.
Parallel lines
lie in the same plane and never intersect.
Congruent angles are angles that have the same
measure. If you were to place one angle on top of the other angle it would match exactly. The symbol congruent to is used to show that angles are congruent. When determining if angles are congruent, it is important that your answer is based only on the measures of the angles. Sometimes angles can appear to be congruent, but when you measure them they have different measures.
Lines that do not intersect may be
parallel or skew.
Lines can be
parallel, intersecting, or skew.
A line segment is
part of a line with two endpoints.
Two lines that intersect and form 90 degree angles are
perpendicular lines
Adjacent angles are angles that
share a side and a have a common vertex.
a line is a
straight path made up of a series of points that extends infinitely in opposite directions. You need two points to determine a line.
Angles don't have to be adjacent to be
supplementary
Segments or rays are parallel or skew if
the lines on which they lie are parallel or skew.
Parallel lines lie on
the same plane and do not intersect
Vertical angles are the opposite angles formed when
two lines intersect
two-column proofs
which is a type of formal proof in which the format involves separating statements and reasons into two columns. Each statement is aligned with the reason that supports it.
Lines x and y are parallel. This is written as
x||y
