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Classifying Triangles
Section 4.1
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Warm Up Classify each angle as acute, obtuse, or right. 1. 2. 3.
3. 4. If the perimeter is 47, find x and the lengths of the three sides.
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A triangle is a 3 Sided polygon.
A polygon is a closed figure in a plane that is made up of segments, called sides., that intersect at points called vertices.
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ΔCDE is made up of: Sides: Vertices: Angles: The side opposite ∠C is:
The angle opposite segment CE is: The side opposite ∠E is:
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Parts of: Equilateral Triangle Isosceles Triangle Right Triangle
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Is it possible for a triangle to have:
A) Two obtuse angles? B) Two right angles? C) one right and one obtuse angle? D) two acute and one obtuse angle?
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ΔBLM is isosceles with base ML.
Identify an acute angle. Name the hypotenuse. Name the vertex angle. Name the side opposite ∠C. Name the angle opposite segment ML. Name the base angles. Name the vertices of the right triangle. Name the legs of the isosceles triangle.
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1. ΔRST is an isosceles triangle. ∠R is the vertex angle
1. ΔRST is an isosceles triangle. ∠R is the vertex angle. RS=x+7, ST=x-1, RT=3x-5. Find x, RS, ST, RT. 2. ΔBCD is isosceles with ∠C as the vertex angle. Find x and the measures of each side if BC=2x+4, BD=x+2 and CD=10.
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3. ΔHKT is equilateral. Find x and the measure of each side if HK=x+7 and HT=4x-8.
4. ΔABC is isosceles with ∠A as the vertex angle. AC is five less than two times a number. AB is three more than the number. BC is one less than the number. Find the measure of each side.
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Given ΔDAR with vertices D(2,6), A(4,-5) and R(-3,0), use the distance formula to show that ΔDAR is scalene.
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Find the side lengths of equilateral ΔFGH.
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4. Find the side lengths of the triangle.
Lesson Quiz Classify each triangle by its angles and sides. MNQ NQP MNP 4. Find the side lengths of the triangle.
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