Areas of Parallelograms and Triangles MCQ Questions for Class 9 Maths Chapter 9 with Answers

We have completed the NCERT/CBSE chapter-wise Multiple Choice Questions for Class 9 Mathematics book Chapter 9 Areas of Parallelograms and Triangles with Answers by expert subject teacher for latest syllabus and examination. You can Prepare effectively for the exam, Taking the help of the Class 9 Mathematics Objective Questions PDF free of cost from here. Students can take a free test of the Multiple Choice Questions of Areas of Parallelograms and Triangles. Each Questions has four options followed by the right answer. Download the Mathematics Quiz Questions with Answers for Class 9 free Pdf and prepare to exam and help students understand the concept very well.

MCQ Questions for Class 9 Mathematics with Answers

Q1. AE is a median to side BC of triangle ABC. If area(ΔABC) = 24 cm, then area(ΔABE) =

(i) 8 cm
(ii) 12 cm
(iii) 16 cm
(iv) 18 cm

(ii) 12 cm

Q2. If P and Q are any two points lying on the sides DC and AD respectively of a parallelogram ABCD, then:

(i) ar(APB) > ar(BQC)
(ii) ar(APB) < ar(BQC)
(iii) ar(APB) = ar(BQC)
(iv) None of the above

(iii) ar(APB) = ar(BQC)

Q3. ABCD is a quadrilateral whose diagonal AC divides it in two parts of equal area, then ABCD is a

(i) rectangle
(ii) rhombus
(iii) parallelogram
(iv) need not be any of (i), (ii) or (iii)

(iv) need not be any of (i), (ii) or (iii)

Q4. A median of a triangle divides it into two

(i) Congruent triangles
(ii) Isosceles triangles
(iii) Right triangles
(iv) Equal area triangles

(iv) Equal area triangles

Q5. Parallelogram ABCD and rectangle ABEF are on the same base AB. If AB = 14 cm, BC = 12 cm, then the possible value for the perimeter of ABEF is

(i) 52
(ii) 64
(iii) 48
(iv) 59

(i) 52

Q6. If Diagonals AC and BD of a trapezium ABCD with AB || DC intersect each other at O. Then,

(i) ar (AOD) = ar (BOC)
(ii) ar (AOD) > ar (BOC)
(iii) ar (AOD) < ar (BOC)
(iv) None of the above

(i) ar (AOD) = ar (BOC)

Q7. In a triangle ABC, E is the mid-point of median AD. Then:

(i) ar(BED) = 1/4 ar(ABC)
(ii) ar(BED) = ar(ABC)
(iii) ar(BED) = 1/2 ar(ABC)
(iv) ar(BED) = 2 ar(ABC)

(i) ar(BED) = 1/4 ar(ABC)

Q8. The median of a triangle divides it into two

(i) isosceles triangle
(ii) congruent triangles
(iii) right angled triangle
(iv) triangles of equal areas

(iv) triangles of equal areas

Q9. Area of a trapezium, whose parallel sides are 9 cm and 6 cm respectively and the distance between these sides is 8 cm, is​

(i) 80 cm²
(ii) 30 cm²
(iii) 120 cm²
(iv) 60 cm²

(iv) 60 cm²

Q10. The area of the figure formed by joining the mid-points of the adjacent sides of a rhombus with diagonals 16 cm and 12 cm is

(i) 24cm²
(ii) 48m²
(iii) 28m²
(iv) 96m²

(ii) 48m²

Q11. Two parallelograms are on equal bases and between the same parallels. The ratio of their areas is:

(i) 1 : 3
(ii) 1 : 2
(iii) 2 : 1
(iv) 1 : 1

(iv) 1 : 1

Q12. If D and E are points on sides AB and AC respectively of ΔABC such that ar(DBC) = ar(EB(iii) Then:

(i) DE is equal to BC
(ii) DE is parallel to BC
(iii) DE is not equal to BC
(iv) DE is perpendicular to BC

(ii) DE is parallel to BC

Q13. D and E are the mid-points of BC and AD respectively. If ar(ΔABC) = 12 cm², then ar(ΔBDE) is

(i) 5 cm²
(ii) 6 cm²
(iii) 3 cm²
(iv) 9 cm²

(iii) 3 cm²

Q14. If Diagonals AC and BD of a trapezium ABCD with AB || DC intersect each other at O. Then,

(i) ar (AOD) = ar (BOC)
(ii) ar (AOD) > ar (BOC)
(iii) ar (AOD) < ar (BOC)
(iv) None of the above

(i) ar (AOD) = ar (BOC)

Q15. ABCD is a quadrilateral P,Q,R and S are the mid-points of AB, BC, CD and DA respectively, then PQRS is a

(i) Square
(ii) Parallelogram
(iii) Trapezium
(iv) Kite

(ii) Parallelogram

Q16. A triangle and a rhombus are on the same base and between the same parallels. Then the ratio of area of triangle to that rhombus is:

(i) 1 : 3
(ii) 1 : 2
(iii) 1 : 1
(iv) 1 : 4

(ii) 1 : 2

Q17. If Diagonals AC and BD of a quadrilateral ABCD intersect at O in such a way that ar(△AOD) = ar(△BOC). Then ABCD is a:

(i) Parallelogram
(ii) Rectangle
(iii) Square
(iv) Trapezium

(iv) Trapezium

Q18. The median of a triangle divides it into two

(i) congruent triangles.
(ii) isosceles triangles.
(iii) right angles.
(iv) triangles of equal areas

(iv) triangles of equal areas

Q19. A median of a triangle divides it into two triangles of

(i) Unequal area
(ii) Each one-fourth of the area of the given triangle.
(iii) Equal sides
(iv) Equal area

(iv) Equal area

Q20. The median of a triangle divides it into two

(i) congruent triangles.
(ii) isosceles triangles.
(iii) right angles.
(iv) triangles of equal areas

(iv) triangles of equal areas

Q21. AE is a median to side BC of triangle ABC. If area(ΔABC) = 24 cm, then area(ΔABE) =

(i) 8 cm
(ii) 12 cm
(iii) 16 cm
(iv) 18 cm

(ii) 12 cm

Q22. What is the area of a parallelogram?

(i) ½ × Base × Altitude
(ii) Base × Altitude
(iii) ¼ × Base × Median
(iv) Base × Base

(ii) Base × Altitude

Q23. The area of a right triangle is 30 sq cm. If the base is 5 cm, then the hypotenuse must be

(i) 12 cm
(ii) 18 cm
(iii) 13 cm
(iv) 20 cm

(iii) 13 cm

Q24. D,E,F are mid points of the sides BC, CA & AB respectively of ΔABC, then area of BDEF is equal to

(i) 1/2ar (ΔABC)
(ii) 1/4ar (ΔABC)
(iii) 1/3ar (ΔABC)
(iv) 1/6ar (ΔABC)

(i) 1/2ar (ΔABC)

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MCQ Questions for Class 9 Mathematicss with Answers

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