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Warm Up. Solve for r 1. 124= π r² 2. 136=(4÷3) π r³. Unit 1 Review. Solving For Vertical Angles. Set angles ____________to each other and solve. equal. 60. X + 2. Solving for Linear Pairs. Add together and set equal to ______________. 2x + 3. 55. 180. Adjacent Angles.
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Warm Up Solve for r 1. 124=πr² 2. 136=(4÷3)πr³
Solving For Vertical Angles Set angles ____________to each other and solve equal 60 X + 2
Solving for Linear Pairs Add together and set equal to ______________ 2x + 3 55 180
Adjacent Angles Angles that are next to each other but DON’T create a ____________line 180
The Properties of Parallelograms A B • Opposite sides are congruent (AB=DC) • Opposite angles are congruent (D=B) • Consecutive angles are supplementary (A+D=180) • If one angle is right, then all angles are right. • The diagonals of a parallelogram bisect each other. • Each diagonal of a parallelogram separates it into two congruent triangles. C D
opp. s Example 1A WXYZ is a parallelogram. Find YZ. YZ = XW Def. of segs. 8a – 4 = 6a + 10 Substitute the given values. Subtract 6a from both sides and add 4 to both sides. 2a = 14 a = 7 Divide both sides by 2. YZ = 8a – 4 = 8(7) – 4 = 52
Alternate Interior Interior angles that lie on different parallel lines and opposite sides of transversal. They are equal to each other! n 1 2 m 4 3 5 6 t 8 7
Alternate Exterior Angles formed outside the parallel lines and on opposite sides of transversal. They are equal! n 1 2 m 4 3 5 6 t 8 7
Corresponding Angles that lie on the same side of the transversal and are situated the same way on two parallel lines. Think: Four CORNERS. They are equal! n 1 2 m 4 3 5 6 t 8 7
Vertical Across the VERTEX from each other. They are equal! n 1 2 m 4 3 5 6 t 8 7
Classifying Triangles Triangle – A figure formed when three noncollinear points are connected by segments. The sides are DE, EF, and DF. The vertices are D, E, and F. The angles are D, E, F. Angle E Side Vertex F D
Base Angles Theorem If two sides of a triangle are congruent, then the angles opposite them are congruent. If , then
Converse of Base Angles Theorem If two angles of a triangle are congruent, then the sides opposite them are congruent. If , then
Right Triangles HYPOTENUSE LEG LEG
Exterior Angles Interior Angles
Triangle Sum Theorem The measures of the three interior angles in a triangle add up to be 180º. x + y + z = 180° x° y° z°
Exterior Angle Theorem The measure of the exterior angle is equal to the sum of two nonadjacent interior angles 1 m1+m2 =m3 2 3
The relationship shown in Example 1 is true for the three midsegments of every triangle.
Example 1 Find each measure. BD ∆ Midsegment Thm. Substitute 17 for AE. BD = 8.5 Simplify.
Solving for missing sides 4 6 x 18
Find X X= 35 x 100˚ 45˚
Solving for Linear Pairs Add together and set equal to ______________ 2x + 3 55 180