Lesson 4.3 Triangle Inequalities Worksheet Answers Today
[ |x - y| < \textthird side < x + y ]
7, 10, 12 Check: (7+10 > 12)? 17>12 ✓ (7+12>10)? 19>10 ✓ (10+12>7)? 22>7 ✓ Answer: Yes Shortcut: Add the two smallest sides. If sum > largest side → triangle. Type 2: Range of possible third side length Given two sides (x) and (y): lesson 4.3 triangle inequalities worksheet answers
30°, 80°, 70° Sides opposite them: smallest angle (30°) → shortest side. Answer: Sides: shortest to longest → opposite 30°, 70°, 80°. Type 4: Determine if angle is largest/smallest from side lengths Just compare side lengths and match to opposite angles. Type 5: Exterior angle problems Exterior angle = sum of two remote interior angles. Also, exterior angle > each remote interior angle. 3. Example Answers (Common Worksheet Format) | Problem | Sides given | Possible triangle? | Reason | |---------|-------------|--------------------|--------| | 1 | 3, 4, 5 | Yes | 3+4>5 | | 2 | 2, 2, 5 | No | 2+2<5 | | 3 | 6, 8, 10 | Yes | 6+8>10 | | 4 | 1, 1, 2 | No | 1+1 not >2 | [ |x - y| < \textthird side <
| Two sides | Possible third side range | |-----------|----------------------------| | 5, 8 | 3 < x < 13 | | 10, 12 | 2 < x < 22 | 22>7 ✓ Answer: Yes Shortcut: Add the two smallest sides
Sides 4 and 9 (|4 - 9| = 5), (4 + 9 = 13) Answer: (5 < \textthird side < 13) Type 3: Order sides/angles from smallest to largest Given side lengths: 8, 5, 7 Angles opposite them: largest side (8) → largest angle, smallest side (5) → smallest angle. Answer: Angles: smallest to largest → opposite sides 5, 7, 8.
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