Presentation is loading. Please wait.

Presentation is loading. Please wait.

Finding the distance between two points. (-4,4) (4,-6)

Published byAbner Goodwin Modified over 9 years ago

Similar presentations

Presentation on theme: "Finding the distance between two points. (-4,4) (4,-6)"— Presentation transcript:

1 Finding the distance between two points. (-4,4) (4,-6)

2 Finding the distance between two points. Draw the right triangle as shown. (-4,4) (4,-6)(-4,-6) 4-(-6)=10

3 Find the length of each leg. (-4,4) (4,-6) (-4,-6) 10 4-(-4)=8

4 Using the Pythagorean theorem, 10 2 + 8 2 = D 2, we calculate the distance between the two points. 100+64 = 164 = D 2. Thus D = 164 (-4,4) (4,-6) (-4,-6) 10 4-(-4)=8

5 To find a formula for this problem, we will create the problem using variables. (x 1,y 1 ) (x 2,y 2 )

6 To find a formula for this problem, we will create the problem using variables. (x 1,y 1 ) (x 2,y 2 ) (x 2,y 1 ) x1x1 x2x2 x 2 - x 1 D

7 To find a formula for this problem, we will create the problem using variables. (x 1,y 1 ) (x 2,y 2 ) (x 2,y 1 ) x1x1 x2x2 y1y1 y2y2 x 2 - x 1 y 2 - y 1 D 2 = (x 2 - x 1 ) 2 + (y 2 - y 1 ) 2 D

8 D = (x 2 - x 1 ) 2 + (y 2 - y 1 ) 2 The distance formula is: Find the distance between (-2,8) and (9, -5) D = (9 - (-2)) 2 + (-5 - 8) 2

9 D = (x 2 - x 1 ) 2 + (y 2 - y 1 ) 2 The distance formula is: Find the distance between (-2,8) and (9, -5) D = (9 - (-2)) 2 + (-5 - 8) 2 D = 11 2 + (-13) 2

10 D = (x 2 - x 1 ) 2 + (y 2 - y 1 ) 2 The distance formula is: Find the distance between (-2,8) and (9, -5) D = (9 - (-2)) 2 + (-5 - 8) 2 D = 11 2 + (-13) 2 D = 121 + 169

11 D = (x 2 - x 1 ) 2 + (y 2 - y 1 ) 2 The distance formula is: Find the distance between (-2,8) and (9, -5) D = (9 - (-2)) 2 + (-5 - 8) 2 D = 11 2 + (-13) 2 D = 121 + 169 D = 290

Download ppt "Finding the distance between two points. (-4,4) (4,-6)"

Similar presentations

Proving the Distance Formula

Proving the Distance Formula
Pythagorean Theorem Properties of Special Right Triangles

Pythagorean Theorem Properties of Special Right Triangles
The Tangent Ratio CHAPTER 7 RIGHT TRIANGLE TRIGONOMETRY.

The Tangent Ratio CHAPTER 7 RIGHT TRIANGLE TRIGONOMETRY.
A number that has a whole number as its square root is called a perfect square. The first few perfect squares are listed below. Slide 8.8- 2.

A number that has a whole number as its square root is called a perfect square. The first few perfect squares are listed below. Slide
Created by G. Antidormi 2003 The Pythagorean Theorem.

Created by G. Antidormi 2003 The Pythagorean Theorem.
7.4: Areas of Trapezoids, Rhombuses and Kites Objectives: To find the area of a trapezoid, rhombus and kite. To use right triangles in finding area of.

7.4: Areas of Trapezoids, Rhombuses and Kites Objectives: To find the area of a trapezoid, rhombus and kite. To use right triangles in finding area of.
Section 8-2 The Pythagorean Theorem Objectives: Solve problems using the Pythagorean Theorem Right Angle: angle that forms 90° Hypotenuse: in a right triangle,

Section 8-2 The Pythagorean Theorem Objectives: Solve problems using the Pythagorean Theorem Right Angle: angle that forms 90° Hypotenuse: in a right triangle,
EXAMPLE 4 Find the length of a hypotenuse using two methods SOLUTION Find the length of the hypotenuse of the right triangle. Method 1: Use a Pythagorean.

EXAMPLE 4 Find the length of a hypotenuse using two methods SOLUTION Find the length of the hypotenuse of the right triangle. Method 1: Use a Pythagorean.
The Pythagorean Theorem. The Right Triangle A right triangle is a triangle that contains one right angle. A right angle is 90 o Right Angle.

The Pythagorean Theorem. The Right Triangle A right triangle is a triangle that contains one right angle. A right angle is 90 o Right Angle.
Special Right Triangles

Special Right Triangles
The Pythagorean Theorem x z y. For this proof we must draw ANY right Triangle: Label the Legs “a” and “b” and the hypotenuse “c” a b c.

The Pythagorean Theorem x z y. For this proof we must draw ANY right Triangle: Label the Legs “a” and “b” and the hypotenuse “c” a b c.
10.7 Write and Graph Equations of Circles Hubarth Geometry.

10.7 Write and Graph Equations of Circles Hubarth Geometry.
The Pythagorean Theorem. 8/18/20152 The Pythagorean Theorem “For any right triangle, the sum of the areas of the two small squares is equal to the area.

The Pythagorean Theorem. 8/18/20152 The Pythagorean Theorem “For any right triangle, the sum of the areas of the two small squares is equal to the area.
Lesson 10.1 The Pythagorean Theorem. The side opposite the right angle is called the hypotenuse. The other two sides are called legs. We use ‘a’ and ‘b’

Lesson 10.1 The Pythagorean Theorem. The side opposite the right angle is called the hypotenuse. The other two sides are called legs. We use ‘a’ and ‘b’
Unit 7 Part 2 Special Right Triangles 30°, 60,° 90° ∆s 45°, 45,° 90° ∆s.

Unit 7 Part 2 Special Right Triangles 30°, 60,° 90° ∆s 45°, 45,° 90° ∆s.
4.4: THE PYTHAGOREAN THEOREM AND DISTANCE FORMULA

4.4: THE PYTHAGOREAN THEOREM AND DISTANCE FORMULA
COORDINATE GEOMETRY Distance between 2 points Mid-point of 2 points.

COORDINATE GEOMETRY Distance between 2 points Mid-point of 2 points.
Chapter 1, Section 6. Finding the Coordinates of a Midpoint  Midpoint Formula: M( (x1+x2)/2, (y1+y2)/2 )  Endpoints (-3,-2) and (3,4)

Chapter 1, Section 6. Finding the Coordinates of a Midpoint  Midpoint Formula: M( (x1+x2)/2, (y1+y2)/2 )  Endpoints (-3,-2) and (3,4)
10.5 – The Pythagorean Theorem. leg legleg hypotenuse hypotenuse leg legleg.

10.5 – The Pythagorean Theorem. leg legleg hypotenuse hypotenuse leg legleg.
MA.912.G.5.1 : Apply the Pythagorean Theorem and its Converse. A.5 ft B.10 ft C. 15 ft D. 18 ft What is the value of x? x 25 ft 20 ft.

MA.912.G.5.1 : Apply the Pythagorean Theorem and its Converse. A.5 ft B.10 ft C. 15 ft D. 18 ft What is the value of x? x 25 ft 20 ft.

Similar presentations

Ads by Google