Math, asked by Archi1930, 1 year ago

Explain... Show that a median of a triangle divides it into two triangles of equal area.?

Answers

Answered by mehak06

let ABC be triangle ...draw AD median ...
prove triangle ABD& ADC congruent ....so when they are proved congruent ...they have same area ...as we know 2 triangles similar to each other have same area..

mehak06: yes

mehak06: means I don't thing that I m time Pass

mehak06: might be

mehak06: no no it okay

Answered by BrainlyQueen01

Given : In ΔABC, AD is the median of the triangle.

To prove : ar ΔABD = ar ΔADC

Construction : Draw AP ⊥ BC.

Proof : ar ΔABC = $\sf \frac{1}{2}$ × BC × AP...... (i)

ar ΔABD = $\sf \frac{1}{2}$ × BD × AP

ar ΔABD = $\sf \frac{1}{2} \times \frac{BC}{2} \times AP$

[AD is the median of ΔABC]

ar ΔABD = $\sf \frac{1}{2}$ × ar ΔABC.. (ii)

ar ΔADC = $\sf \frac{1}{2}$ × DC × AP

ar ΔADC = $\sf \frac{1}{2} \times \frac{BC}{2} \times AP$

ar ΔADC = $\sf \frac{1}{2}$ × ar ΔABC.. (iii)

From equation (i), (ii) and (iii)

ar ΔABD = ar ΔADC = $\sf \frac{1}{2}$ ar ΔABC

Hence, it is proved.

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