in exercises 2 and 3, determine which two statements contradict each other. explain your reasoning.② a $ riangle lmn$ is equilateral.b $lm
eq mn$c $angle l = angle m$③a $ riangle abc$ is a right triangle.b $angle a$ is acute.c $angle c$ is obtuse.ccomplete the phrase with the most logical conclusion.1. if there is no right angle in a triangle, then...2. if two lines do not have the same slope, then...3. if a quadrilateral does not have four right angles, then...4. if no two angles of a triangle are congruent, then...5. if the sum of the measures of the interior angles of a polygon is not $180^circ$, then...

Question

in exercises 2 and 3, determine which two statements contradict each other. explain your reasoning.② a  $	riangle lmn$ is equilateral.b  $lm
eq mn$c  $angle l = angle m$③a  $	riangle abc$ is a right triangle.b  $angle a$ is acute.c  $angle c$ is obtuse.ccomplete the phrase with the most logical conclusion.1. if there is no right angle in a triangle, then...2. if two lines do not have the same slope, then...3. if a quadrilateral does not have four right angles, then...4. if no two angles of a triangle are congruent, then...5. if the sum of the measures of the interior angles of a polygon is not $180^circ$, then...

Accepted Answer

### For Exercise 2:
# Brief Explanations:
An equilateral triangle has all sides congruent ($LM=MN=NL$) and all angles congruent ($\angle L=\angle M=\angle N$). Statement A claims $	riangle LMN$ is equilateral, while Statement B says $LM
eq MN$ (a direct contradiction of equilateral side properties), and Statement C says $\angle L=\angle M$ (consistent with equilateral triangle angle properties).
# Answer:
A. $	riangle LMN$ is equilateral, B. $LM
eq MN$

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### For Exercise 3:
# Brief Explanations:
A right triangle has exactly one right angle (90°), with the other two angles being acute (sum to 90°). Statement A claims $	riangle ABC$ is a right triangle, while Statement C says $\angle C$ is obtuse (greater than 90°). A triangle cannot have both a right angle and an obtuse angle (their sum would exceed 180°, violating the triangle angle sum theorem). Statement B says $\angle A$ is acute, which is consistent with a right triangle.
# Answer:
A. $	riangle ABC$ is a right triangle, C. $\angle C$ is obtuse

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### For Section C:
# Brief Explanations:
1. A triangle's angles are either acute, right, or obtuse; no right angle means all angles are between 0° and 90° (acute) or one is obtuse.
2. Lines with different slopes are not parallel, so they intersect at exactly one point.
3. A quadrilateral can have 0, 1, 2, 3, or 4 right angles; not having 4 means it has 0-3 right angles.
4. A triangle with no congruent angles has all sides of different lengths by the converse of the isosceles triangle theorem.
5. The sum of interior angles of a triangle is 180°, so if the sum is not 180°, the shape cannot be a triangle.
# Answer:
1.  all angles are acute or one is obtuse
2.  the lines intersect (are not parallel)
3.  it has 0, 1, 2, or 3 right angles
4.  no two sides are congruent (it is scalene)
5.  the polygon is not a triangle

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For Exercise 2:

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For Exercise 3: