To constuct a triangle similar to a give...

To constuct a triangle similar to a given `DeltaABC` with its sides `(7)/(3)` of the corresponding side of `DeltaABC`, draw a ray BX making acute angle with BC and X lies on the opposite side of A with respect of BC. The points `B_(1),B_(2),…..,B_(7)` are located at equal distances on BX, `B_(3)` is joined to C and then a line segment `B_(6)C'` is drawn parallel to `B_(3)C`, where C' lines on BC produced. Finally line segment A'C' is drawn parallel to AC.

Topper's Solved these Questions

CONSTRUCTIONS
OSWAL PUBLICATION|Exercise NCERT Corner (Exercise - 10.3)|4 Videos
CONSTRUCTIONS
OSWAL PUBLICATION|Exercise NCERT Corner (Exercise - 10.4)|6 Videos
CONSTRUCTIONS
OSWAL PUBLICATION|Exercise NCERT Corner (Exercise - 10.1)|6 Videos
CIRCLES
OSWAL PUBLICATION|Exercise SELF ASSESSMENT|5 Videos
COORDINATE GEOMETRY
OSWAL PUBLICATION|Exercise SELF ASSESSMENT |20 Videos

Similar Questions

Explore conceptually related problems

To construct a triangle similar to a given DeltaABC with its sides (3)/(7) of the corresponding sides of DeltaABC , first draw a ray BX such that angleCBX is an acute angle and X lies 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

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

To construct a triangle similar to a given DeltaABC with its sides (3)/(7) of the corresponding sides of DeltaABC , first draw a ray BX such that angleCBX is an acute angle and X lies on the opposite side of A with respect to BC. Then, locate points B_(1),B_(2),B_(3),..... on BX at equal distances and next step is to join

To divide a line segment AB in the ratio 5:6, draw a ray AX such that angleBAX is an acute angle, the draw a ray BY parallel to AX and the points A_(1),A_(2),A_(3),….." and " B_(1),B_(2),B_(3),….. are located to equal distances on ray AX and BY, respectively. Then, the points joined are

To divide a line segment BC internally in the ratio 3 : 5, we draw a ray BX such that angle CBX is an acute angle. What will be the minimum number of points to be located at equal distances, on ray BX?

The altitudes from the vertices A,B,C of an acute angled triangle ABC to the opposite sides meet the circumcircle at D,E,F respectively . Then (EF)/(BC) =

In DeltaABC, angleB and angleC are acute angles. BE and CF are perpendicular from vertices B and C on sides AC and AB respectively. Then BC^(2) is equal to-

OSWAL PUBLICATION-CONSTRUCTIONS-NCERT Corner (Exercise - 10.2) (True or False)

By geometrical construction, it is possible to divide a line segment i...
Text Solution
|
To constuct a triangle similar to a given DeltaABC with its sides (7)/...
Text Solution
|
A pair of tangents can be constructed from a point P to a circle of ra...
Text Solution
|
A pair of tangents can be constructed to a circle inclined at an angl...
Text Solution
|