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geometry
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triangle inequality theorem - independent pract. date ____________ team ____
state if the three numbers can be the measures of the sides of a triangle.
1) 12, 10, 25
2) 21, 11, 9
3) 8, 13, 7
4) 13, 9, 6
5) 12, 3, 9
6) 2, 7, 7
two sides of a triangle have the following measures. find the range of possible measures for
the third side.
7) 7, 12
8) 8, 8
9) 9, 12
10) 9, 8
11) 10, 8
12) 12, 8

Question

Accepted Answer

# Explanation: ## Step1: Apply Triangle Inequality Theorem For three side lengths $a, b, c$ (where $c$ is the largest), check if $a + b > c$. --- ### Problem 1: 12, 10, 25 ## Step1: Identify largest side Largest side = 25 ## Step2: Sum smaller sides $12 + 10 = 22$ ## Step3: Compare sum to largest $22 gtr 25$ --- ### Problem 2: 21, 11, 9 ## Step1: Identify largest side Largest side = 21 ## Step2: Sum smaller sides $11 + 9 = 20$ ## Step3: Compare sum to largest $20 gtr 21$ --- ### Problem 3: 8, 13, 7 ## Step1: Identify largest side Largest side = 13 ## Step2: Sum smaller sides $8 + 7 = 15$ ## Step3: Compare sum to largest $15 > 13$ --- ### Problem 4: 13, 9, 6 ## Step1: Identify largest side Largest side = 13 ## Step2: Sum smaller sides $9 + 6 = 15$ ## Step3: Compare sum to largest $15 > 13$ --- ### Problem 5: 12, 3, 9 ## Step1: Identify largest side Largest side = 12 ## Step2: Sum smaller sides $3 + 9 = 12$ ## Step3: Compare sum to largest $12 gtr 12$ --- ### Problem 6: 2, 7, 7 ## Step1: Identify largest side Largest side = 7 ## Step2: Sum smaller sides $2 + 7 = 9$ ## Step3: Compare sum to largest $9 > 7$ --- ### Problem 7: 7, 12 (find third side $x$) ## Step1: Use inequality rules For sides $a, b, x$: $|a - b| < x < a + b$ ## Step2: Calculate bounds $|12 - 7| = 5$, $12 + 7 = 19$ ## Step3: Write range $5 < x < 19$ --- ### Problem 8: 8, 8 (find third side $x$) ## Step1: Use inequality rules $|8 - 8| < x < 8 + 8$ ## Step2: Calculate bounds $|8 - 8| = 0$, $8 + 8 = 16$ ## Step3: Write range $0 < x < 16$ --- ### Problem 9: 9, 12 (find third side $x$) ## Step1: Use inequality rules $|12 - 9| < x < 12 + 9$ ## Step2: Calculate bounds $|12 - 9| = 3$, $12 + 9 = 21$ ## Step3: Write range $3 < x < 21$ --- ### Problem 10: 9, 8 (find third side $x$) ## Step1: Use inequality rules $|9 - 8| < x < 9 + 8$ ## Step2: Calculate bounds $|9 - 8| = 1$, $9 + 8 = 17$ ## Step3: Write range $1 < x < 17$ --- ### Problem 11: 10, 8 (find third side $x$) ## Step1: Use inequality rules $|10 - 8| < x < 10 + 8$ ## Step2: Calculate bounds $|10 - 8| = 2$, $10 + 8 = 18$ ## Step3: Write range $2 < x < 18$ --- ### Problem 12: 12, 8 (find third side $x$) ## Step1: Use inequality rules $|12 - 8| < x < 12 + 8$ ## Step2: Calculate bounds $|12 - 8| = 4$, $12 + 8 = 20$ ## Step3: Write range $4 < x < 20$ # Answer: 1) No 2) No 3) Yes 4) Yes 5) No 6) Yes 7) $5 < x < 19$ 8) $0 < x < 16$ 9) $3 < x < 21$ 10) $1 < x < 17$ 11) $2 < x < 18$ 12) $4 < x < 20$

QUESTION IMAGE

Question

Explanation:

Step1: Apply Triangle Inequality Theorem

Problem 1: 12, 10, 25

Step1: Identify largest side

Step2: Sum smaller sides

Step3: Compare sum to largest

Problem 2: 21, 11, 9

Step1: Identify largest side

Step2: Sum smaller sides

Step3: Compare sum to largest

Problem 3: 8, 13, 7

Step1: Identify largest side

Step2: Sum smaller sides

Step3: Compare sum to largest

Problem 4: 13, 9, 6

Step1: Identify largest side

Step2: Sum smaller sides

Step3: Compare sum to largest

Problem 5: 12, 3, 9

Step1: Identify largest side

Step2: Sum smaller sides

Step3: Compare sum to largest

Problem 6: 2, 7, 7

Step1: Identify largest side

Step2: Sum smaller sides

Step3: Compare sum to largest

Problem 7: 7, 12 (find third side $x$)

Step1: Use inequality rules

Step2: Calculate bounds

Step3: Write range

Problem 8: 8, 8 (find third side $x$)

Step1: Use inequality rules

Step2: Calculate bounds

Step3: Write range

Problem 9: 9, 12 (find third side $x$)

Step1: Use inequality rules

Step2: Calculate bounds

Step3: Write range

Problem 10: 9, 8 (find third side $x$)

Step1: Use inequality rules

Step2: Calculate bounds

Step3: Write range

Problem 11: 10, 8 (find third side $x$)

Step1: Use inequality rules

Step2: Calculate bounds

Step3: Write range

Problem 12: 12, 8 (find third side $x$)

Step1: Use inequality rules

Step2: Calculate bounds

Step3: Write range

Answer: