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The Pythagorean Theorem c a b
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Pythagorean Theorem Essential Questions
How is the Pythagorean Theorem used to identify side lengths? When can the Pythagorean Theorem be used to solve real life patterns?
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This is a right triangle:
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We call it a right triangle because it contains a right angle.
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The measure of a right angle is 90o
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The little square in the angle tells you it is a right angle. 90o
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About 2,500 years ago, a Greek mathematician named Pythagorus discovered a special relationship between the sides of right triangles.
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Pythagorus realized that if you have a right triangle,
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and you square the lengths of the two sides that make up the right angle,
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and add them together, 3 4 5
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you get the same number you would get by squaring the other side.
3 4 5
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Is that correct? ? ?
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It is. And it is true for any right triangle.
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The two sides which come together in a right angle are called
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The two sides which come together in a right angle are called
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The two sides which come together in a right angle are called
legs.
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The lengths of the legs are usually called a and b.
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The side across from the right angle is called the
hypotenuse. a b
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And the length of the hypotenuse is usually labeled c.
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The relationship Pythagorus discovered is now called The Pythagorean Theorem:
b
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The Pythagorean Theorem says, given the right triangle with legs a and b and hypotenuse c,
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then c a b
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You can use The Pythagorean Theorem to solve many kinds of problems.
Suppose you drive directly west for 48 miles, 48
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Then turn south and drive for 36 miles.
48 36
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How far are you from where you started?
48 36 ?
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Using The Pythagorean Theorem,
48 482 + 362 = c2 36 c
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Why? Can you see that we have a right triangle? 48 36 c 482 362 + = c2
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Which side is the hypotenuse?
Which sides are the legs? 48 36 c 482 362 + = c2
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Then all we need to do is calculate:
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And you end up 60 miles from where you started.
So, since c2 is 3600, c is 60. So, since c2 is 3600, c is 48 36 60
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Find the length of a diagonal of the rectangle:
15" 8" ?
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Find the length of a diagonal of the rectangle:
15" 8" ? b = 8 c a = 15
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b = 8 a = 15 c
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Find the length of a diagonal of the rectangle:
15" 8" 17
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Practice using The Pythagorean Theorem to solve these right triangles:
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5 12 c = 13
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10 b 26
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= 24 10 b 26 (a) (c)
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Check It Out! Example 2 A rectangular field has a length of 100 yards and a width of 33 yards. About how far is it from one corner of the field to the opposite corner of the field? Round your answer to the nearest tenth.
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Understand the Problem
Check It Out! Example 2 Continued 1 Understand the Problem Rewrite the question as a statement. • Find the distance from one corner of the field to the opposite corner of the field. List the important information: • Drawing a segment from one corner of the field to the opposite corner of the field divides the field into two right triangles. • The segment between the two corners is the hypotenuse. • The sides of the fields are legs, and they are 33 yards long and 100 yards long.
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Check It Out! Example 2 Continued
Make a Plan You can use the Pythagorean Theorem to write an equation.
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Check It Out! Example 2 Continued
Solve 3 a2 + b2 = c2 Use the Pythagorean Theorem. = c2 Substitute for the known variables. ,000 = c2 Evaluate the powers. 11,089 = c2 Add. c Take the square roots of both sides. 105.3 c Round. The distance from one corner of the field to the opposite corner is about yards.
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The Pythagorean Theorem
“For any right triangle, the sum of the areas of the two small squares is equal to the area of the larger.” a2 + b2 = c2
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Proof
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Let’s look at it this way…
c a c b b c2 a2 b2
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Baseball Problem A baseball “diamond” is really a square.
You can use the Pythagorean theorem to find distances around a baseball diamond.
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Baseball Problem The distance between consecutive bases is 90
feet. How far does a catcher have to throw the ball from home plate to second base?
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Baseball Problem To use the Pythagorean theorem to solve for x, find the right angle. Which side is the hypotenuse? Which sides are the legs? Now use: a2 + b2 = c2
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Baseball Problem Solution
The hypotenuse is the distance from home to second, or side x in the picture. The legs are from home to first and from first to second. Solution: x2 = = 16,200 x = ft
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Ladder Problem A ladder leans against a second-story window of a house. If the ladder is 25 meters long, and the base of the ladder is 7 meters from the house, how high is the window?
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Ladder Problem Solution
First draw a diagram that shows the sides of the right triangle. Label the sides: Ladder is 25 m Distance from house is 7 m Use a2 + b2 = c2 to solve for the missing side. Distance from house: 7 meters
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Ladder Problem Solution
b = 24 m How did you do?
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