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Question
Question 8
If the medians of a ΔABC intersect at G, then show that ar(ΔAGB)=ar(ΔBGC)=ar(ΔAGC)=13ar(ΔABC).
If the medians of a ΔABC intersect at G, then show that ar(ΔAGB)=ar(ΔBGC)=ar(ΔAGC)=13ar(ΔABC).
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Solution
We know that, a median of a triangle divides it into two triangles of equal area.
InΔABC, AD is a median.
∴ar(ΔABD)=ar(ΔACD) ....(i)
In ΔBGC, GD is a median.
∴ar(ΔGBD)=ar(ΔGCD) ....(ii)
On subtracting Eq. (ii) from Eq. (i), we get,
ar(ΔABD)−ar(ΔGBD)=ar(ΔACD)−a(ΔGCD)
⇒ar(ΔAGB)=ar(ΔAGC) ...(iii)
Similarly,
ar (ΔAGB)=ar (ΔBGC) ...(iv)
From Eqs. (iii) and (iv),
ar (ΔAGB)=ar (ΔBGC)=ar (ΔAGC) ...(v)
Now,
ar (ΔABC)=ar (ΔAGB)+ar (ΔBGC)+ar (ΔAGC)
⇒ar (ΔABC)=ar (ΔAGB)+ar (ΔAGB)+ar (ΔAGB) [From Eq. (v)]
⇒ar (ΔABC)=3 ar (ΔAGB)
⇒ar (ΔAGB)=13ar(ΔABC) ...(vi)
From Eqs. (v) and (vi)
ar (ΔBGC)=13ar (ΔABC)
ad ar (ΔAGC)=12ar(ΔABC)
Hence proved.
We know that, a median of a triangle divides it into two triangles of equal area.
InΔABC, AD is a median.
∴ar(ΔABD)=ar(ΔACD) ....(i)
In ΔBGC, GD is a median.
∴ar(ΔGBD)=ar(ΔGCD) ....(ii)
On subtracting Eq. (ii) from Eq. (i), we get,
ar(ΔABD)−ar(ΔGBD)=ar(ΔACD)−a(ΔGCD)
⇒ar(ΔAGB)=ar(ΔAGC) ...(iii)
Similarly,
ar (ΔAGB)=ar (ΔBGC) ...(iv)
From Eqs. (iii) and (iv),
ar (ΔAGB)=ar (ΔBGC)=ar (ΔAGC) ...(v)
Now,
ar (ΔABC)=ar (ΔAGB)+ar (ΔBGC)+ar (ΔAGC)
⇒ar (ΔABC)=ar (ΔAGB)+ar (ΔAGB)+ar (ΔAGB) [From Eq. (v)]
⇒ar (ΔABC)=3 ar (ΔAGB)
⇒ar (ΔAGB)=13ar(ΔABC) ...(vi)
From Eqs. (v) and (vi)
ar (ΔBGC)=13ar (ΔABC)
ad ar (ΔAGC)=12ar(ΔABC)
Hence proved.
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