Let ABC be an isosceles triangle with AB...

Let `ABC` be an isosceles triangle with `AB = BC.` If base `BC` is parallel to x-axis and `m_1 and m_2` are the slopes of medians drawn through the angular points `B and C,` then

Similar Questions

Explore conceptually related problems

Let ABC be an isosceles triangle with BC as its base. Then, rr_(1)=

ABC is an isosceles triangle with AB = AC. Draw AP _|_ BC to show that A = B.

ABC is an isosceles triangle with AC = BC. If A B^2=2A C^2 , prove that ABC is a right triangle.

ABC is an isosceles triangle with AB = AC and D is a point on AC such that BC^2=ACxxCD . Prove that BD = BC

In a triangle ABC, AB is parallel to y-axis, BC is parallel to x-axis, centroid is at (2, 1), If median through C is x-y=1, then the slope of median through A is

In a triangle ABC, AB is parallel to y-axis, BC is parallel to x-axis, centroid is at (2, 1), If median through C is x-y=1 , then the slope of median through A is

The side of BC of an equilateral triangle Delta ABC is parallel to X-axis. Find the slopes of line along sides BC, CA and AB.

DeltaABC is an isosceles triangles with AB = AC = 10 cm,AD =8 cm M is the median on BC from A. The length of BC is

The side BC of an equilateral Delta ABC is parallel to X - axis . Find the slopes of line along sides BC , CA and AB .

Let `ABC` be an isosceles triangle with `AB = BC.` If base `BC` is parallel to x-axis and `m_1 and m_2` are the slopes of medians drawn through the angular points `B and C,` then

Similar Questions

Recommended Questions