Advertisements
Advertisements
Question
Construct an isosceles triangle with base 8 cm and altitude 4 cm. Construct another triangle whose sides are `2/3` times the corresponding sides of the isosceles triangle.
Solution
Steps of Construction
Step 1. Draw a line segment BC = 8 cm.
Step 2. Draw the perpendicular bisector XY of BC, cutting BC at D.
Step 3. With D as centre and radius 4 cm, draw an arc cutting XY at A.
Step 4. Join AB and AC. Here, ∆ABC is an isosceles whose base is 8 cm and altitude is 4 cm.
Step 5. Below BC, draw an acute angle ∠CBX.
Step 6. Along BX, mark three points B1, B2 and B3 such that BB1 = B1B2 = B2B3.
Step 7. Join CB3.
Step 8. From B2, draw B2C' || CB3 meeting BC at C'.
Step 9. From C', draw A'C' || AC meeting AB in A'.
Here, ∆A'BC' is the required triangle similar to ∆ABC such that each side of ∆A'BC' is `2/3` times the corresponding side of ∆ABC.
APPEARS IN
RELATED QUESTIONS
Construct a Δ ABC in which AB = 6 cm, ∠A = 30° and ∠B = 60°, Construct another ΔAB’C’ similar to ΔABC with base AB’ = 8 cm.
Construct a triangle ABC in which BC = 6 cm, AB = 5 cm and ∠ABC = 60°. Then construct another triangle whose sides are`3/4` times the corresponding sides of ΔABC.
Divide a line segment of length 14 cm internally in the ratio 2 : 5. Also, justify your construction.
Draw a right triangle ABC in which AC = AB = 4.5 cm and ∠A = 90°. Draw a triangle similar to ΔABC with its sides equal to (5/4)th of the corresponding sides of ΔABC.
Draw a line segment AB of length 7 cm. Using ruler and compasses, find a point P on AB such that `(AP)/(AB) = 3/5 `.
Given A(4, –3), B(8, 5). Find the coordinates of the point that divides segment AB in the ratio 3 : 1.
ΔABC ~ ΔPBR, BC = 8 cm, AC = 10 cm , ∠B = 90°, `"BC"/"BR" = 5/4` then construct ∆ABC and ΔPBR
By geometrical construction, it is possible to divide a line segment in the ratio ______.
Draw the line segment AB = 5cm. From the point A draw a line segment AD = 6cm making an angle of 60° with AB. Draw a perpendicular bisector of AD. Select the correct figure.
To divide a line segment PQ in the ratio 5 : 7, first a ray PX 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 ______.
