Parts of a Triangle: Median in an isosceles triangle - properties

Classify a triangle by its sides Is it possible...?Using the median to calculate the perimeter Using the theorem: The median of a triangle divides it into two triangles of the same area Using parallel lines Determine the size of the given angles Identify the greater value Median in a right-angled triangle Using properties of the median Identifying the sides in a triangle using median and height Calculate Angles in Quadrilaterals True / false Identifying sides in a triangle Using angles in a triangle Identifying and defining elements Finding the size of angles in a triangle

Question 1

ABC is an isosceles triangle.

AD is the median.

What is the size of angle $∢\text{ADC}$ ?

Question 2

AD is the median in triangle ABC.

BD = 4

Find the length of DC.

Question 3

Triangle ABC is isosceles (AB=AC).

AD is the median.

Is it true that $∢\text{BAD}=∢\text{DAC}$ ?

Question 4

Look at the triangle below.

AD is the median and crossed the predominant angle.

Is triangle ABC isosceles?

Examples with solutions for Parts of a Triangle: Median in an isosceles triangle - properties

Exercise #1

ABC is an isosceles triangle.

AD is the median.

What is the size of angle $∢\text{ADC}$ ?

Video Solution

Step-by-Step Solution

In an isosceles triangle, the median to the base is also the height to the base.

That is, side AD forms a 90° angle with side BC.

That is, two right triangles are created.

Therefore, angle ADC is equal to 90 degrees.

Answer

90

Exercise #2

AD is the median in triangle ABC.

BD = 4

Find the length of DC.

Video Solution

Answer

4

Exercise #3

Triangle ABC is isosceles (AB=AC).

AD is the median.

Is it true that $∢\text{BAD}=∢\text{DAC}$ ?

Video Solution

Answer

Yes.

Exercise #4

Look at the triangle below.

AD is the median and crossed the predominant angle.

Is triangle ABC isosceles?

Video Solution

Answer

Yes.