ANSWER THIS QUESTION I WILL MARK THE CORRECT ANSWER AS BRAINLIEST!!!SOLVE WITHOUT SIMILARITIES OF TRIANGLES, In triangle ABC,M and N are the mid points of Ab and AC respectively. The altitude AP to BC intersect MN at O. prove that AO = OP
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Answer:
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Step-by-step explanation:
Consider the triangle ABC, M and N are the midpoints of the sides AB and AC respectively.
Let AP be the altitude from the vertex A to the side BC.
The line joining the midpoints of AB and AC meet the altitude AP at O.
Required to prove that AO = OP.
So, we have to prove that AO = ½AP
In triangle ABC.
M and N are the midpoints of the sides AB and AC.
So, we have
AM = ½AB; AN = ½ AC
According to the Midpoint Theorem,
MN = ½ BC
So, ΔABC ~ ΔAMN
⇒ Area(AMN) / Area(ABC) = MN2 / BC2
= ( BC/2 )2 / BC2
= 1/4
= AO2 / AP2
So,
AO/AP = 1/2
AO = ½ AP
Hence, AO = OP.
Answer:
Step-by-step explanation:
Sonabrainly Maths AryaBhatta
Consider the triangle ABC, M and N are the midpoints of the sides AB and AC respectively.
Let AP be the altitude from the vertex A to the side BC.
The line joining the midpoints of AB and AC meet the altitude AP at O.
Required to prove that AO = OP.
So, we have to prove that AO = ½AP
In triangle ABC.
M and N are the midpoints of the sides AB and AC.
So, we have
AM = ½AB; AN = ½ AC
According to the Midpoint Theorem,
MN = ½ BC
So, ΔABC ~ ΔAMN
⇒ Area(AMN) / Area(ABC) = MN2 / BC2
= ( BC/2 )2 / BC2
= 1/4
= AO2 / AP2
So,
AO/AP = 1/2
AO = ½ AP
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