Steps of construction (i) Draw a line segment BC = 8 cm. (ii) At point B, Using ruler and compass, draw an angle ∠CBX = 45°. (iii) Taking B as centre and radius 3.5 cm, mark an arc, which intersects AX at D. (iv) Jion CD and draw a perpendicular bisector (MN) of CD, which intersects at BD produced aRead more
Steps of construction
(i) Draw a line segment BC = 8 cm.
(ii) At point B, Using ruler and compass, draw an angle ∠CBX = 45°.
(iii) Taking B as centre and radius 3.5 cm, mark an arc, which intersects AX at D.
(iv) Jion CD and draw a perpendicular bisector (MN) of CD, which intersects at BD produced at A.
(v) join AC.
(vi) Triangle ABC is the required triangle.
Justification
Point A lies on the perpendicular bisector of DC. So, AD = AC
Here, AB = BD – AD
⇒ AB = BD – AC [∵ AD = AC]
Steps of construction (i) Draw a line segment QR = 6 cm. (ii) At point Q, Using ruler and compass, draw an angle ∠RQX = 60°. Produce XQ to K. (iii) Taking Q as centre and 2 cm as radius, draw an arc which intersects QK at S. (iv) Jion SR and draw a perpendicular bisector (MN) of SR, which intersectsRead more
Steps of construction
(i) Draw a line segment QR = 6 cm.
(ii) At point Q, Using ruler and compass, draw an angle ∠RQX = 60°. Produce XQ to K.
(iii) Taking Q as centre and 2 cm as radius, draw an arc which intersects QK at S.
(iv) Jion SR and draw a perpendicular bisector (MN) of SR, which intersects QX at point P.
(v) join PR. Triangle PQR is the required triangle.
Justification
Point P lies on the perpendicular bisector of SR. So, PS = PR
Here, QS = PS – PQ
⇒ QS = PR – AC [∵ PS = PR]
Steps of construction (i) Draw a line segment AB = 11 cm. (ii) At A, Using ruler and compass, draw an angle ∠BAX = 15° and at point B, draw an angle ∠ABX = 45°. (iii) Draw the perpendicular bisector (MN) of AX, which intersects AB at Y. (iv) Draw the perpendicular bisector (ST) of BX, which intersecRead more
Steps of construction
(i) Draw a line segment AB = 11 cm.
(ii) At A, Using ruler and compass, draw an angle ∠BAX = 15° and at point B, draw an angle ∠ABX = 45°.
(iii) Draw the perpendicular bisector (MN) of AX, which intersects AB at Y.
(iv) Draw the perpendicular bisector (ST) of BX, which intersects AB at Z
(v) join X to Y and X to Z.
(vi) Triangle XYZ is the required triangle.
Justification
Point Y lies on the perpendicular bisector of AX.
So, AY = XY
Point Z lies on the perpendicular bisector of BX.
So, BZ = ZX
Here, AB = AY + YZ + ZB
⇒ AB = XY + YZ + ZX
[∵ AY = XY and BZ = XZ]
∠XYZ is the exterior angle of triangle AXY. Therefore, ∠XYZ = ∠YXA + ∠YAX = 15° + 15° = 30° Similarly, ∠XYZ is the exterior angle of triangle BXZ.
Hence, ∠XZY = ∠ZXB + ∠ZBX = 45° + 45° = 90°
Steps of construction (i) Draw a line segment AB = 12 cm. (ii) At point A, Using ruler and compass, draw an angle ∠BAX = 90°. (iii) Taking A as centre and 18 cm as radius, draw an arc which intersect AX at D. (iv) Join B to D. Draw a perpendicular bisector (MN) of BD which intersects AD at C. (v) joRead more
Steps of construction
(i) Draw a line segment AB = 12 cm.
(ii) At point A, Using ruler and compass, draw an angle ∠BAX = 90°.
(iii) Taking A as centre and 18 cm as radius, draw an arc which intersect AX at D.
(iv) Join B to D. Draw a perpendicular bisector (MN) of BD which intersects AD at C.
(v) join B to C. Triangle ABC is the required triangle.
Justification
Point C lies on the perpendicular bisector of BD.
So, BC = CD
Here, AD = AC + CD
⇒ AD = AC + BC [∵ BC = CD]
Construct a triangle ABC in which BC = 8cm, ∠B = 45° and AB – AC = 3.5 cm.
Steps of construction (i) Draw a line segment BC = 8 cm. (ii) At point B, Using ruler and compass, draw an angle ∠CBX = 45°. (iii) Taking B as centre and radius 3.5 cm, mark an arc, which intersects AX at D. (iv) Jion CD and draw a perpendicular bisector (MN) of CD, which intersects at BD produced aRead more
Steps of construction
See less(i) Draw a line segment BC = 8 cm.
(ii) At point B, Using ruler and compass, draw an angle ∠CBX = 45°.
(iii) Taking B as centre and radius 3.5 cm, mark an arc, which intersects AX at D.
(iv) Jion CD and draw a perpendicular bisector (MN) of CD, which intersects at BD produced at A.
(v) join AC.
(vi) Triangle ABC is the required triangle.
Justification
Point A lies on the perpendicular bisector of DC. So, AD = AC
Here, AB = BD – AD
⇒ AB = BD – AC [∵ AD = AC]
Construct a triangle PQR in which QR = 6cm, ∠Q = 60° and PR – PQ = 2cm.
Steps of construction (i) Draw a line segment QR = 6 cm. (ii) At point Q, Using ruler and compass, draw an angle ∠RQX = 60°. Produce XQ to K. (iii) Taking Q as centre and 2 cm as radius, draw an arc which intersects QK at S. (iv) Jion SR and draw a perpendicular bisector (MN) of SR, which intersectsRead more
Steps of construction
See less(i) Draw a line segment QR = 6 cm.
(ii) At point Q, Using ruler and compass, draw an angle ∠RQX = 60°. Produce XQ to K.
(iii) Taking Q as centre and 2 cm as radius, draw an arc which intersects QK at S.
(iv) Jion SR and draw a perpendicular bisector (MN) of SR, which intersects QX at point P.
(v) join PR. Triangle PQR is the required triangle.
Justification
Point P lies on the perpendicular bisector of SR. So, PS = PR
Here, QS = PS – PQ
⇒ QS = PR – AC [∵ PS = PR]
Construct a triangle XYZ in which ∠Y = 30°, ∠Z = 90° and XY + YZ + ZX = 11 cm.
Steps of construction (i) Draw a line segment AB = 11 cm. (ii) At A, Using ruler and compass, draw an angle ∠BAX = 15° and at point B, draw an angle ∠ABX = 45°. (iii) Draw the perpendicular bisector (MN) of AX, which intersects AB at Y. (iv) Draw the perpendicular bisector (ST) of BX, which intersecRead more
Steps of construction
See less(i) Draw a line segment AB = 11 cm.
(ii) At A, Using ruler and compass, draw an angle ∠BAX = 15° and at point B, draw an angle ∠ABX = 45°.
(iii) Draw the perpendicular bisector (MN) of AX, which intersects AB at Y.
(iv) Draw the perpendicular bisector (ST) of BX, which intersects AB at Z
(v) join X to Y and X to Z.
(vi) Triangle XYZ is the required triangle.
Justification
Point Y lies on the perpendicular bisector of AX.
So, AY = XY
Point Z lies on the perpendicular bisector of BX.
So, BZ = ZX
Here, AB = AY + YZ + ZB
⇒ AB = XY + YZ + ZX
[∵ AY = XY and BZ = XZ]
∠XYZ is the exterior angle of triangle AXY. Therefore, ∠XYZ = ∠YXA + ∠YAX = 15° + 15° = 30° Similarly, ∠XYZ is the exterior angle of triangle BXZ.
Hence, ∠XZY = ∠ZXB + ∠ZBX = 45° + 45° = 90°
Construct a right triangle whose base is 12 cm and sum of its hypotenuse and other side is 18 cm.
Steps of construction (i) Draw a line segment AB = 12 cm. (ii) At point A, Using ruler and compass, draw an angle ∠BAX = 90°. (iii) Taking A as centre and 18 cm as radius, draw an arc which intersect AX at D. (iv) Join B to D. Draw a perpendicular bisector (MN) of BD which intersects AD at C. (v) joRead more
Steps of construction
See less(i) Draw a line segment AB = 12 cm.
(ii) At point A, Using ruler and compass, draw an angle ∠BAX = 90°.
(iii) Taking A as centre and 18 cm as radius, draw an arc which intersect AX at D.
(iv) Join B to D. Draw a perpendicular bisector (MN) of BD which intersects AD at C.
(v) join B to C. Triangle ABC is the required triangle.
Justification
Point C lies on the perpendicular bisector of BD.
So, BC = CD
Here, AD = AC + CD
⇒ AD = AC + BC [∵ BC = CD]
Draw different pairs of circles. How many points does each pair have in common? What is the maximum number of common points?
In each pair either 0 or 1 or 2 points are common. The maximum number of common points is 2.
In each pair either 0 or 1 or 2 points are common. The maximum number of common points is 2.
See less