Similar Triangles Similar triangles are very useful for indirectly determining the sizes of items which are difficult to measure by hand.

Slides:

Advertisements

Similar presentations

Honors Geometry Section 8. 5

Advertisements

CHAPTER 7 Ratio and Proportion Slide 2Copyright 2012, 2008, 2004, 2000 Pearson Education, Inc. 7.1Introduction to Ratios 7.2Rates and Unit Prices 7.3Proportions.

Grid method for multiplying by a 1 digit number. 1.Firstly, write the multiplication sum and then draw the grid. The largest number goes at the top so.

Jeopardy Solving Equations Simplifying Radicals

Lesson Menu Main Idea and New Vocabulary NGSSS Example 1:Use Shadow Reckoning Example 2:Use Indirect Measurement Five-Minute Check.

Transparency 7 Click the mouse button or press the Space Bar to display the answers.

Indirect measurement Problems

SOLVING RIGHT TRIANGLES Using your definitions to solve “real world” problems.

EXAMPLE 3 Standardized Test Practice.

EXAMPLE 3 Standardized Test Practice. EXAMPLE 3 Standardized Test Practice SOLUTION The flagpole and the woman form sides of two right triangles with.

Slide Copyright © 2007 Pearson Education, Inc. Publishing as Pearson Addison-Wesley.

3.4: Using Similar Triangles

EXAMPLE 5 Use indirect measurement While standing at Yavapai Point near the Grand Canyon, you measure an angle of 90º between Powell Point and Widforss.

Using Similar Figures to Solve Problems. There are a variety of problems that can be solved with similar triangles. To make things easier use or draw.

~adapted from Walch Education Solving Problems Using Similarity and Congruence.

Splash Screen. Lesson Menu Five-Minute Check (over Chapter 3) Then/Now New Vocabulary Key Concept: Trigonometric Functions Example 1:Find Values of Trigonometric.

Lesson 13.1, For use with pages

5-7 Indirect Measurement Warm Up Problem of the Day

PRE-ALGEBRA. Lesson 6-3 Warm-Up PRE-ALGEBRA What are “similar figures”? similar figures: figures that have the same exact shape but not the same size.

Geometry H2 (Holt 7-5)K. Santos.  Tyler wants to find the height of a telephone pole. He measured the pole’s shadow and his own shadow. What is the height.

MA.8.G.2.1 Use similar triangles to solve problems that include height and distances Block 30.

Lesson 8 MI/Vocab indirect measurement Solve problems involving similar triangles.

Find Actual Measurements

Target: Use proportions to solve problems involving similar figures.

Problems of the Day 1) 2)Challenge: Two triangles are similar. The ratio of the lengths of the corresponding sides is If the length of one side of the.

Bell Work Find the measure of the missing value in the pair of similar polygons. (Shapes not drawn to scale.) 1. x 30 m 7 m 70 m 3 m 2. 2 mm x 5 mm 27.5.

Trigonometry Section 3 – Solve Application Problems using Right Triangle Trigonometry.

 Ratio: is the comparison of two numbers by division  Ratio of two numbers can be shown like this; a to b, a:b, or a/b  Proportion: equation that says.

9-4 Polygons in the Coordinate Plane Learn to draw polygons in the coordinate plane and find the lengths of their sides.

Lesson 8 MI/Vocab. Lesson 8 Ex1 Use Shadow Reckoning TREES A tree in front of Marcel’s house has a shadow 12 feet long. Marcel’s shadow.

2.8 – Proportions & Similar Figures “I can solve proportions using scale factors.” “I can find missing side lengths of similar figures.”

Splash Screen. Lesson Menu Five-Minute Check (over Lesson 4–8) Main Idea and Vocabulary Example 1:Use Shadow Reckoning Example 2:Use Indirect Measurement.

Similar Figures and Indirect Measurement 2 3 = f 21 Review: Solve each Proportion, Round to the Nearest Tenth Where Necessary. You may use your calculators.

Right Triangle Trig Applications Angles of Elevation and Depression Dr. Shildneck Fall, 2014.

Right Triangle Trigonometry

Right Triangles and Problem Solving. Applications: Angles of Elevation and Depression Angle of elevation: the line of sight above the horizontal Angle.

Angles of Elevation and Depression

Objective To use angles of elevation and depression to solve problems.

Warm-up. Law of Sines and Cosines Students will be able to apply the Law of Sines and the Law of Cosines to solve problems involving oblique triangles.

Holt CA Course Using Similar Figures Warm Up Warm Up California Standards California Standards Lesson Presentation Lesson PresentationPreview.

B A C D E 9m 13m 50m river A new bridge is going to be built across a river, but the width of the river cannot be measured directly. Find the width of.

Graph of the Day y = mx + b Rise = Run = m = b = y =

TRIGONOMETRIC RATIOS The Trigonometric Functions we will be looking at SINE COSINE TANGENT.

Ratio and Proportion Introductory Trigonometry. 2 Finding the height of something very tall can be easily determined by setting up proportions of similar.

Holt McDougal Geometry 7-5 Using Proportional Relationships Warm Up Convert each measurement ft 3 in. to inches 2. 5 m 38 cm to centimeters Find.

4.2 Using Similar Shapes How can you use similar shapes to find unknown measures?

Holt CA Course Using Similar Figures Warm Up Warm Up California Standards California Standards Lesson Presentation Lesson PresentationPreview.

trigonometric functions sine cosine tangent cosecant secant cotangent

4.1 – Right Triangle Trigonometry

Jeopardy Final Jeopardy $100 $100 $100 $100 $200 $200 $200 $200 $300

Using Proportional Relationships

5-7 Indirect Measurement Warm Up Problem of the Day

5-5 Distance on the Coordinate Plane!

Angles of Elevation & Angles of Depression

Geometry-Part 5.

عناصر المثلثات المتشابهة Parts of Similar Triangles

Similar Figures Chapter 5.

= Models, Equations, & Explanation

8.2 Perpendicular Lines.

Right Triangle Trigonometry

Main Idea and New Vocabulary Example 1: Use Shadow Reckoning

Indirect Measurement 5-10

Bellringer a.) Sheryl bought 3 pieces of candy for $1.29. At that rate, what would 8 pieces of candy cost her? $3.44.

Right Triangle Trigonometry

Warm Up Problem of the Day Lesson Presentation Lesson Quizzes.

Trig Problems – Problem Solving

Similar Figures The Big and Small of it.

Presentation transcript:

Similar Triangles Similar triangles are very useful for indirectly determining the sizes of items which are difficult to measure by hand.

Typical examples include building heights

Tree Heights

Towers

Similar Triangles can also be used to measure the width of a river.

4. Two instructors want to set up a Flying Fox across a river for an outdoor education camp. achal_pradesh

The first thing they need to know is how wide the river is so they can set up ropes long enough to make the crossing.

Would it be helpful for each person to move further along the river and measure exactly how far they moved from their starting points at A and B?

The lady walks 15 m to the left, and then 5 m back from the river bank to finish at point E.

We can draw in the line of sight from the lady at “E” to the guy on the other side of the river at “C” which then produces a pair of Similar Triangles.

We can solve these “bow tie” triangles and work out the width of the river as shown below.

About how long is the log that goes across the creeks?

Find the distance from the park to the house.