Title: Warm Up(Add to Notes)
1Warm Up(Add to Notes) 1. Write a conditional
from the sentence An isosceles triangle has two
congruent sides. 2. Write the contrapositive
of the conditional If it is Tuesday, then John
has a piano lesson. 3. Show that the
conjecture If x gt 6, then 2x gt 14 is false by
finding a counterexample.
If a ? is isosc., then it has 2 ? sides.
If John does not have a piano lesson, then it is
not Tuesday.
x 7
25-5
Indirect Proof and Inequalities in One Triangle
Holt Geometry
3In an indirect proof, you assume that the
conclusion is false. Then you show that this
assumption leads to a contradiction. This type of
proof is also called a proof by contradiction.
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5Check It Out! Example 1
Write an indirect proof that a triangle cannot
have two right angles.
Step 1 Identify the conjecture to be proven.
Given A triangles interior angles add up to
180.
Prove A triangle cannot have two right angles.
Step 2 Assume the opposite of the conclusion.
An angle has two right angles.
6Check It Out! Example 1 Continued
Step 3 Use direct reasoning to lead to a
contradiction.
m?1 m?2 m?3 180
90 90 m?3 180
180 m?3 180
m?3 0
However, by the Protractor Postulate, a triangle
cannot have an angle with a measure of 0.
7Check It Out! Example 1 Continued
Step 4 Conclude that the original conjecture is
true.
The assumption that a triangle can have two right
angles is false.
Therefore a triangle cannot have two right angles.
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9Write the angles in order from smallest to
largest.
The angles from smallest to largest are ?F, ?H
and ?G.
10Check It Out! Example 2b
Write the sides in order from shortest to longest.
m?E 180 (90 22) 68
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12Example 3A Applying the Triangle Inequality
Theorem
Tell whether a triangle can have sides with the
given lengths. Explain.
7, 10, 19
Noby the Triangle Inequality Theorem, a triangle
cannot have these side lengths.
13Example 4 Finding Side Lengths
The lengths of two sides of a triangle are 8
inches and 13 inches. Find the range of possible
lengths for the third side.
Let x represent the length of the third side.
Then apply the Triangle Inequality Theorem.
x 8 gt 13
x 13 gt 8
8 13 gt x
x gt 5
x gt 5
21 gt x
Combine the inequalities. So 5 lt x lt 21. The
length of the third side is greater than 5 inches
and less than 21 inches.
14Example 5 Travel Application
The figure shows the approximate distances
between cities in California. What is the range
of distances from San Francisco to Oakland?
Let x be the distance from San Francisco to
Oakland.
x 46 gt 51
x 51 gt 46
46 51 gt x
? Inequal. Thm.
x gt 5
x gt 5
97 gt x
Subtr. Prop. of Inequal.
5 lt x lt 97
Combine the inequalities.
The distance from San Francisco to Oakland is
greater than 5 miles and less than 97 miles.
15Lesson Quiz Part I
1. Write the angles in order from smallest to
largest. 2. Write the sides in order from
shortest to longest.
?C, ?B, ?A
16Lesson Quiz Part II
3. The lengths of two sides of a triangle are 17
cm and 12 cm. Find the range of possible lengths
for the third side. 4. Tell whether a triangle
can have sides with lengths 2.7, 3.5, and 9.8.
Explain.
5 cm lt x lt 29 cm
No 2.7 3.5 is not greater than 9.8.
5. Ray wants to place a chair so it is 10 ft from
his television set. Can the other two
distances shown be 8 ft and 6 ft? Explain.
Yes the sum of any two lengths is greater than
the third length.