Class-10,Constructions

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Name of Student *

Contact No. *

Q1) To divide a line segment AB in the ratio 5 : 7, first a ray AX is drawn so that ∠BAX is an acute angle and then at equal distances points are marked on the ray AX such that the minimum number of these points is: *

1 point

Q2) To divide a line segment AB in the ratio p: q ( p, q are positive integers), draw a ray AX so that ∠BAX is an acute angle and then mark points on ray AX at equal distances such that the minimum number of these points is: *

1 point

p + q – 1

greater of p and q

p + q

Q3) To construct a triangle similar to given withΔABC its sides 8/5 of the corresponding sides of,ΔABC 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 distances on ray BX is: *

1 point

Q4) To divide a line segment AB in the ration 2 : 5, first a ray AX is drawn, so that ∠BAX is an acute angle and then at equal distances points are marked on the ray such that the minimum number of these points is : *

1 point

Q5) To construct a triangle similar to given triangle ΔABC with its sides of 3/7 the corresponding sides, draw ΔABC 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 distances on ray BX is: *

1 point

Q6) To divide a line segment PQ in the ratio 2 : 7, first a ray PZ is drawn so that ∠QPX is an acute angle and then at equal distances points are marked on the ray PX such that the minimum number of these points is : *

1 point

Q7) To divide a line segment LM in the ratio a : b, where a and b are positive integers, draw a ray LX so that ∠MLX is an acute angle and then mark points on the ray LX at equal distances such that the minimum number of these points is : *

1 point

a + b

greater of a and b

a + b – 1

Q8) To construct a triangle similar to given ΔABC with its sides of 7/4 the corresponding sides of ΔABC, with 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 distances on ray BX is : *

1 point