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Draw a line segment of length 7.6 cm and divide it in the ratio 5:3. Measure the two parts.
A line segment of length 7.6 cm can be divided in the ratio of 5:8 as follows:
Step 1 Draw line segment AB of 7.6 cm and draw a ray AX making an acute angle with line segment AB.
Step 2 Locate 13 (= 5 + 8) points, , on AX such that
and so on.
Step 3 Join
Step 4 Through the point , draw a line parallel to
(by making an angle equal to
) at
intersecting AB at point C.
C is the point dividing line segment AB of 7.6 cm in the required ratio of
The lengths of AC and CB can be measured. It comes out to 2.9 cm and 4.7 cm respectively.
Construct a triangle of sides 4 cm, 5 cm and 6 cm and then a triangle similar to it whose sides are of the corresponding sides of the first triangle.
Step 1
Draw a line segment AB = 4 cm. Taking point A as centre, draw an arc of 5 cm radius. Similarly, taking point B as its centre, draw an arc of 6 cm radius. These arcs will intersect each other at point C. Now, AC = 5 cm and BC = 6 cm and is the required triangle.
Step 2
Draw a ray AX making an acute angle with line AB on the opposite side of vertex C.
Step 3
Locate 3 points (as 3 is greater between 2 and 3) on line AX such that
.
Step 4
Join and draw a line through
parallel to
to intersect AB at point B'.
Step 5
Draw a line through B' parallel to the line BC to intersect AC at C'.
is the required triangle.
Construct a triangle with sides 5 cm, 6 cm and 7 cm and then another triangle whose sides are of the corresponding sides of the first triangle.
Step 1
Draw a line segment AB of 5 cm. Taking A and B as centre, draw arcs of 6 cm and 7 cm radius respectively. Let these arcs intersect each other at point C. is the required triangle having the length of sides as 5 cm, 6 cm, and 7 cm respectively.
Step 2
Draw a ray AX making an acute angle with line AB on the opposite side of vertex C.
Step 3
Locate 7 points, (as 7 is greater between 5and 7), on line AX such that
.
Step 4
Join and draw a line through
parallel to
to intersect extended line segment AB at point B'.
Step 5
Draw a line through B' parallel to BC intersecting the extended line segment AC at C'. is the required triangle.
Construct an isosceles triangle whose base is 8 cm and altitude 4 cm and then another triangle whose sides are times the corresponding sides of the isosceles triangle.
Let us assume that is an isosceles triangle having CA and CB of equal lengths, base AB of 8 cm, and AD is the altitude of 4 cm.
A whose sides are
times of can be drawn as follows.
Step 1
Draw a line segment AB of 8 cm. Draw arcs of same radius on both sides of the line segment while taking point A and B as its centre. Let these arcs intersect each other at O and O'. Join OO'. Let OO' intersect AB at D.
Step 2
Taking D as centre, draw an arc of 4 cm radius which cuts the extended line segment OO' at point C. An isosceles ΔABC is formed, having CD (altitude) as 4 cm and AB (base) as 8 cm.
Step 3
Draw a ray AX making an acute angle with line segment AB on the opposite side of vertex C.
Step 4
Locate 3 points (as 3 is greater between 3 and 2) , and
on AX such that
.
Step 5
Join and draw a line through
parallel to
to intersect extended line segment AB at point B'.
Step 6
Draw a line through B' parallel to BC intersecting the extended line segment AC at C'. is the required triangle.
Draw a triangle ABC with side BC = 6 cm, AB = 5 cm and . Then construct a triangle whose sides are
of the corresponding sides of the triangle ABC.
A whose sides are
of the corresponding sides of
can be drawn as follows.
Step 1
Draw a with side BC = 6 cm, AB = 5 cm and
.
Step 2
Draw a ray BX making an acute angle with BC on the opposite side of vertex A.
Step 3
Locate 4 points (as 4 is greater in 3 and 4), , on line segment BX.
Step 4
Join and draw a line through
, parallel to
intersecting BC at C'.
Step 5
Draw a line through C' parallel to AC intersecting AB at A'. is the required triangle.
Draw a triangle ABC with side BC = 7 cm, ,
. Then, construct a triangle whose sides are
times the corresponding sides of
.
∠B = 45°, ∠A = 105°
Sum of all interior angles in a triangle is 180°.
∠A + ∠B + ∠C = 180°
105° + 45° + ∠C = 180°
∠C = 180° − 150°
∠C = 30°
The required triangle can be drawn as follows.
Step 1
Draw a ΔABC with side BC = 7 cm, ∠B = 45°, ∠C = 30°.
Step 2
Draw a ray BX making an acute angle with BC on the opposite side of vertex A.
Step 3
Locate 4 points (as 4 is greater in 4 and 3), B1, B2, B3, B4, on BX.
Step 4
Join B3C. Draw a line through B4 parallel to B3C intersecting extended BC at C'.
Step 5
Through C', draw a line parallel to AC intersecting extended line segment at C'. ΔA'BC' is the required triangle.
Draw a right triangle in which the sides (other than hypotenuse) are of lengths 4 cm and 3 cm. Then construct another triangle whose sides are times the corresponding sides of the given triangle.
It is given that sides other than hypotenuse are of lengths 4 cm and 3 cm. Clearly, these will be perpendicular to each other.
The required triangle can be drawn as follows.
Step 1
Draw a line segment AB = 4 cm. Draw a ray SA making 90° with it.
Step 2
Draw an arc of 3 cm radius while taking A as its centre to intersect SA at C. Join BC. ΔABC is the required triangle.
Step 3
Draw a ray AX making an acute angle with AB, opposite to vertex C.
Step 4
Locate 5 points (as 5 is greater in 5 and 3), A1, A2, A3, A4, A5, on line segment AX such that AA1 = A1A2 = A2A3 = A3A4 = A4A5.
Step 5
Join A3B. Draw a line through A5 parallel to A3B intersecting extended line segment AB at B'.
Step 6
Through B', draw a line parallel to BC intersecting extended line segment AC at C'. ΔAB'C' is the required triangle.
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