Mathematics

D is a point on base BC of a ΔABC such that 2BD = DC. Prove that :
ar (ΔABD) = $\dfrac{1}{3}$ ar (ΔABC).

Theorems on Area

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Answer

Given,

2BD = DC

$\dfrac{BD}{DC} = \dfrac{1}{2}$

We know that,

Ratio of the area of triangles with same vertex and bases along the same line is equal to the ratio of their respective bases.

$\Rightarrow \dfrac{\text{Area of Δ ABD}}{\text{Area of Δ ADC}} = \dfrac{BD}{DC} \\[1em] \Rightarrow \dfrac{\text{Area of Δ ABD}}{\text{Area of Δ ADC}} = \dfrac{1}{2} \\[1em] \Rightarrow \text{Area of Δ ADC} = 2 \times \text{Area of Δ ABD}.$

From figure,

⇒ Area of Δ ABC = Area of Δ ABD + Area of Δ ADC

⇒ Area of Δ ABC = Area of Δ ABD + 2 Area of Δ ABD

⇒ Area of Δ ABC = 3 Area of Δ ABD

⇒ Area of Δ ABD = $\dfrac{1}{3}$ ar (ΔABC).

Hence, proved that Area of Δ ABD = $\dfrac{1}{3}$ ar (ΔABC).

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Mathematics

D is a point on base BC of a ΔABC such that 2BD = DC. Prove that :
ar (ΔABD) = $\dfrac{1}{3}$ ar (ΔABC).

Theorems on Area

Answer

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Mathematics

D is a point on base BC of a ΔABC such that 2BD = DC. Prove that :ar (ΔABD) = 13\dfrac{1}{3}31​ ar (ΔABC).

Theorems on Area

Answer

Related Questions

In the given figure, a point D is taken on side BC of ΔABC and AD is produced to E, making DE = AD. Show that :ar (ΔBEC) = ar (ΔABC).

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In the given figure, AD is a median of ΔABC and P is a point on AC such that :ar (ΔADP) : ar (ΔABD) = 2 : 3.Find :(i) AP : PC(ii) ar (ΔPDC) : ar (ΔABC)

In the given figure, P is a point on side BC of ΔABC such that BP : PC = 1 : 2 and Q is a point on AP such that PQ : QA = 2 : 3. Show that :ar (ΔAQC) : ar (ΔABC) = 2 : 5.

D is a point on base BC of a ΔABC such that 2BD = DC. Prove that :
ar (ΔABD) = $\dfrac{1}{3}$ ar (ΔABC).

In the given figure, a point D is taken on side BC of ΔABC and AD is produced to E, making DE = AD. Show that :
ar (ΔBEC) = ar (ΔABC).

If the medians of a ΔABC intersect at G, show that :
ar (ΔAGB) = ar (ΔAGC) = ar (ΔBGC) = $\dfrac{1}{3}$ ar (ΔABC).

In the given figure, AD is a median of ΔABC and P is a point on AC such that :
ar (ΔADP) : ar (ΔABD) = 2 : 3.
Find :
(i) AP : PC
(ii) ar (ΔPDC) : ar (ΔABC)

In the given figure, P is a point on side BC of ΔABC such that BP : PC = 1 : 2 and Q is a point on AP such that PQ : QA = 2 : 3. Show that :
ar (ΔAQC) : ar (ΔABC) = 2 : 5.