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We will determine1 how to apply Triangle Proportionality2 theorem to find segment lengths.
LEARNING OBJECTIVE Definition figure out Two ratios that have the same value. Declare the Objective A: Read the Objective to B. B: Define Proportionality to A CFU What are we going to learn today? What is βProportionalityβ mean? G-SRT.5. Use congruence and similarity criteria for triangles to solve problems and to prove relationships in geometric figures.
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ACTIVATE PRIOR KNOWLEDGE
Remember the Concept Cross Products property. Solve for x use the Cross products property. 1. Solve for x, 2. Solve for x, = ? 4 x 8 3 x β Cross products property Cross products property 4(x β 3) = x 8 ππ ππ+π =ππ(ππ+π) Simplify. 216π + 216=ππππ+ππ 4x β 12 = 8x βπππx βπππ βπππx βπππ ACTIVATE PRIOR KNOWLEDGE Subtract 4x from each side. βπππ=βπππ β12 = 4x π=π Divide each side by 4. β3 = x Make the Connection Students, you already know how to use cross product to solve for x. Today, we will learn how to apply Triangle Proportionality theorem to find segment lengths.
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B Explain to A: what is Triangle Proportionality theorem states?
On your white board, using the Triangle Proportionality Theorem write the correct ratios? CFU T B Explain to A: what is Triangle Proportionality theorem states?
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ππ+π π = ππ+π π Check for Understanding
How did I/you write the proportional ratios? How did I/you I solve for x? CFU 1 2 Write the ratio using Triangle Proportionality theorem. Use the Cross Product rule to solve for x. Check you answer. Steps to find the segment lengths 1 2 3 1. 2. Check for Understanding A Explain to B: How did I write the ratio and find the x? CONCEPT DEVELOPMENT ππ+π π = ππ+π π Cross products property Cross products property ππ ππ+π =ππ(ππ+π) π ππ+π =π(ππ+π) 216π + 216=ππππ+ππ βπππx βπππ βπππx βπππ πππ+ππ =πππ+π βππ βπππ=βπππ βπππ βππ βπππ π=π βππ=βππ π=π
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no Check for Understanding
How did I/you write the proportional ratios? How did I/you I solve for x? CFU 1 2 Write the ratio using Triangle Proportionality theorem. Use the Cross Product rule to solve for x. Check you answer. Steps to find the segment lengths 1 2 3 1. 2. In order to show that we must show that CONCEPT DEVELOPMENT Since the sides are proportional. Check for Understanding B Explain to A: How did I show that GH is parallel to FE? no Answer: Since the segments have proportional lengths, GH || FE.
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Relevance Reason #1: Proportionality is used Maps
In the figure, Larch, Maple, and Nuthatch Streets are all parallel. The figure shows the distances in between city blocks. Find x. Notice that the streets form a triangle that is cut by parallel lines. So you can use the Triangle Proportionality Theorem. Relevance Reason #1: Know how to find geometric mean will help you do well on tests (PSAT, SAT, ACT, GRE, GMAT, LSAT, etc..). Check for Understanding Does anyone else have another reason why it is relevant to use verb tense correctly? Which reason is most relevant to you? Why? Answer: x = 32
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What did you learn today about how to apply Triangle Proportionality theorem to find segment lengths. Word Bank Proportionality Segment Lengths SUMMARY CLOSURE Today, I learned how to __________________ ______________________________________________________________.
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