Axioms, postulates, equivalence reasoning MCQs
Practice Axioms, postulates, equivalence reasoning multiple-choice questions from Introduction to Euclid's Geometry (Class 9 Maths) - tap an answer for instant feedback and a step-by-step solution. Practice the full set free on the RankByte app.
Axioms, postulates, equivalence reasoningQuiz - Solve & Score
Q1. The statement 'two non-parallel lines in a plane intersect in exactly one point' relies on which Euclidean assumption?
- A.Combination of Postulate 1 and the modern notion that two lines having two common points coincide
- B.Postulate 5 alone
- C.The common notion 'the whole is greater than the part'
- D.Postulate 3 (circles)
Answer: A. Combination of Postulate 1 and the modern notion that two lines having two common points coincide
NCERT fact (math, chapter 'Introduction to Euclid's Geometry'): If two non-parallel lines meet at all, they meet at one point - for two distinct lines sharing two points would coincide by Postulate 1. So the result combines Postulate 1 with the uniqueness of a line through two points. Postulate 5 is needed only to guarantee non-parallel lines do meet. Final answer - A) Combination of Postulate 1 and the modern notion that two lines having two common points coincide.
Q2. If a + b = c (lengths) and d = e, then a + b + d = c + e by which axiom?
- A.Equals added to equals are equal
- B.Equals subtracted from equals are equal
- C.The whole is greater than the part
- D.Doubles of equals are equal
Answer: A. Equals added to equals are equal
Key chapter idea: Adding equal quantities d = e to both sides preserves equality (Euclid's second common notion). Consequently the correct option is A) Equals added to equals are equal.
Q3. Which is NOT equivalent to Euclid's fifth postulate?
- A.Two distinct lines cannot meet in more than one point
- B.Through a point not on a line, exactly one parallel passes
- C.Sum of angles of a triangle equals two right angles
- D.There exists a pair of similar triangles which are not congruent
Answer: A. Two distinct lines cannot meet in more than one point
The idea this question leans on: The first statement follows already from the first postulate and does not need the fifth. The other three are classical equivalents of the parallel postulate. Hence the answer is A) Two distinct lines cannot meet in more than one point.
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