Q5.

Question

Suppose you are given the three lengths shown and are asked to construct a triangle whose sides have lengths $r, s,$ and $t .$ Can you do so $?$ State the theorem from Chapter $6$ that applies.

Step-by-Step Solution

Verified

Answer

No, it’s not possible to construct a triangle whose sides have lengths $r, s$ and $t$ .

1Step 1. Given information.

Three lengths are given.

2Step 2. Concept used.

According to triangle inequality theorem,

In a triangle,

the sum of the spans of any two sides is always greater than the span of the third side.

3Step 3. Observe the following figure.

Here, from the figure,

it can be observed that $r + s < t$

Therefore, it’s not possible to construct a triangle whose sides have lengths $r, s$ and $t$ .

Q4.

Q6.

Other exercises in this chapter

Q3.

Explain how you could construct a 30° angle.

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Q4.

Exercise 3 suggests that you could construct other angles with certain measures. Name some.

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Q6.

∠1 and ∠2 are given. You see two attempts at constructing an angle whose measure is equal to m∠1+m∠2. Are both constructions satisfactor

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Q1.

On your paper, draw two segments roughly like those shown. Use these segments in Exercise 1-4 to construct a segment having the indicated length. a+b

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