Hi students, Welcome to **AMBiPi (Amans Maths Blogs)**. In this article, you will get * Constructions Class 10 Maths MCQ Questions with Answer Keys*. You can download this PDF and save it in your mobile device or laptop etc.

**Constructions MCQ Questions for Class 10 Question No 11:**

To divide a line segment AB in the ratio 5 : 6, draw a ray AX such that ∠BAX is an acute angle, then draw a ray BY parallel too AX and the points A_{1}, A_{2}, A_{3}, … and B_{1}, B_{2}, B_{3,}… are located at equal distance on ray AX and BY respectively. Then, the points joined are

**Option A** : A_{5} and B_{6}

**Option B** : A_{6} and B_{5}

**Option C** : A_{4} and B_{5}

**Option D** : A_{5} and B_{4}

**Show/Hide Answer Key**

**Option A : A _{5} and B_{6}**

**Constructions MCQ Questions for Class 10 Question No 12:**

To construct a triangle similar to a given ∆ABC, first draw a ray BX such that ∠CBX is an acute angle and X lies on the opposite side of A with respect to BC. Then, locate the points B_{1}, B_{2}, B_{3}, … on BX at equal distance and next step is to join.

**Option A** : B_{10} to C

**Option B** : B_{3} to C

**Option C** : B_{7} to C

**Option D** : B_{4} to C

**Show/Hide Answer Key**

**Option C : B _{7} to C**

**Constructions MCQ Questions for Class 10 Question No 13:**

To construct a triangle similar to given triangle ABC with its sides 8/5 of the corresponding sides of ∆ABC draw a ray BX such that ∠CBX is an acute angle and X is on the opposite side of A with respect to BC. The minimum number of points to be located at equal distance on ray BX is

**Option A** : 5

**Option B** : 8

**Option C** : 13

**Option D** : 3

**Show/Hide Answer Key**

**Option B : 8**

**Constructions MCQ Questions for Class 10 Question No 14:**

To divide a line segment AB in the ratio p : q (p and q are positive integers), draw a ray AX so that ∠BAX is an acute angle and then mark point on ray AX at equal distance such that the minimum number of points on these points is

**Option A** : Greater of p and q

**Option B** : p + q

**Option C** : p + q – 1

**Option D** : pq

**Show/Hide Answer Key**

**Option B : p + q**

**Constructions MCQ Questions for Class 10 Question No 15:**

By geometrical construction, it is possible to divide a line segment in the ratio.

**Option A** : √3, 1/√3

**Option B** : √3, 1/√2

**Option C** : √3, √2

**Option D** : √3, √2/√3

**Show/Hide Answer Key**

**Option A : √3, 1/√3**

**Constructions MCQ Questions for Class 10 Question No 16:**

If a point P divides a line segment AB such that PB/AB = 3/7, then the ratio of AP : PB will be

**Option A** : 4 : 7

**Option B** : 7 : 4

**Option C** : 7 : 3

**Option D** : 4 : 3

**Show/Hide Answer Key**

**Option D : 4 : 3**

**Constructions MCQ Questions for Class 10 Question No 17:**

In the figure below, the ratio in which the point P divides the line segment AB is

**Option A** : 3 : 2

**Option B** : 2 : 3

**Option C** : 2 : 1

**Option D** : 3 : 1

**Show/Hide Answer Key**

**Option A : 3 : 2**

**Constructions MCQ Questions for Class 10 Question No 18:**

In the figure below, the line segment AB is divided by the line in the ratio of

**Option A** : 3 : 2

**Option B** : 3 : 4

**Option C** : 4 : 3

**Option D** : 2 : 3

**Show/Hide Answer Key**

**Option B : 3 : 4**

**Constructions MCQ Questions for Class 10 Question No 19:**

The theorem, in which the division of a line segment is explain, is

**Option A** : Similarity criterion

**Option B** : Area Theorem

**Option C** : Basic Proportionality Theorem

**Option D** : Pythagoras Theorem,

**Show/Hide Answer Key**

**Option A : 8**

**Constructions MCQ Questions for Class 10 Question No 20:**

In the figure below, ∆ABC is constructed similar to ∆BDE. In ∆ABC = 90 degree, AB = 3 cm and BC = 4 cm. If the corresponding sides of ∆BDE is 5/2 times that of ∆ABC, then the length of the BD and DE respectively are

**Option A** : 10 cm and 7.5 cm

**Option B** : 7.5 cm and 10 cm

**Option C** : 8 cm 12 cm

**Option D** : 12 cm, 8 cm

**Show/Hide Answer Key**

**Option A : 10 cm and 7.5 cm**