In the adjoining figure, ABCD is a parallelogram. P is a point on DC such that ar (ΔAPD) = 25 cm² and ar (ΔBPC) = 15 cm². Calculate :
(i) ar (∥ gm ABCD)
(ii) DP : PC

Question

In the adjoining figure, ABCD is a parallelogram. P is a point on DC such that ar (ΔAPD) = 25 cm2 and ar (ΔBPC) = 15 cm2. Calculate : (i) ar (∥ gm ABCD) (ii) DP : PC

KnowledgeBoat · Accepted Answer

(i) Since,

∆APB and ||gm ABCD have same base AB and are between same parallel lines AB and DC. So,

area of ∆APB = $\dfrac{1}{2}$ area of ||gm ABCD

From figure,

⇒ $\dfrac{1}{2}$ area of ||gm ABCD = area of (∆DAP + ∆BCP)

⇒ $\dfrac{1}{2}$ area of ||gm ABCD = 25 + 15

⇒ $\dfrac{1}{2}$ area of ||gm ABCD = 40

⇒ area of ||gm ABCD = 2 × 40 = 80 cm².

Hence, area of ||gm ABCD = 80 cm².

(ii) From figure,

∆DAP and ∆BCP are on the same base CD and between the same parallel lines CD and AB.

$\Rightarrow \dfrac{\text{Area of ∆DAP}}{\text{Area of ∆BCP}} = \dfrac{DP}{PC} \\[1em] \Rightarrow \dfrac{25}{15} = \dfrac{DP}{PC} \\[1em] \Rightarrow \dfrac{DP}{PC} = \dfrac{5}{3}.$

Hence, DP : PC = 5 : 3.

Mathematics

In the adjoining figure, ABCD is a parallelogram. P is a point on DC such that ar (ΔAPD) = 25 cm² and ar (ΔBPC) = 15 cm². Calculate :
(i) ar (∥ gm ABCD)
(ii) DP : PC

Theorems on Area

Answer

Related Questions

In the adjoining figure, ABCD is a parallelogram. Any line through A cuts DC at a point P and BC produced at Q. Prove that : ar (ΔBPC) = ar (ΔDPQ).

In the adjoining figure, ABCD is a parallelogram. P is a point on BC such that BP : PC = 1 : 2. DP produced meets AB produced at Q. Given ar (ΔCPQ) = 20 cm². Calculate :
(i) ar (ΔCDP)
(ii) ar (∥ gm ABCD)

In the given figure, AB ∥ DC ∥ EF, AD ∥ BE and DE ∥ AF. Prove that : ar (∥ gm DEFH) = ar (∥ gm ABCD).

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(i) ∠EAC = ∠BAF
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Mathematics

In the adjoining figure, ABCD is a parallelogram. P is a point on DC such that ar (ΔAPD) = 25 cm2 and ar (ΔBPC) = 15 cm2. Calculate :(i) ar (∥ gm ABCD)(ii) DP : PC

Theorems on Area

Answer

Related Questions

In the adjoining figure, ABCD is a parallelogram. Any line through A cuts DC at a point P and BC produced at Q. Prove that : ar (ΔBPC) = ar (ΔDPQ).

In the adjoining figure, ABCD is a parallelogram. P is a point on BC such that BP : PC = 1 : 2. DP produced meets AB produced at Q. Given ar (ΔCPQ) = 20 cm2. Calculate :(i) ar (ΔCDP)(ii) ar (∥ gm ABCD)

In the given figure, AB ∥ DC ∥ EF, AD ∥ BE and DE ∥ AF. Prove that : ar (∥ gm DEFH) = ar (∥ gm ABCD).

In the given figure, squares ABDE and AFGC are drawn on the side AB and hypotenuse AC of right triangle ABC and BH ⟂ FG. Prove that :(i) ∠EAC = ∠BAF(ii) ar (sq. ABDE) = ar (rect. ARHF)

In the adjoining figure, ABCD is a parallelogram. P is a point on DC such that ar (ΔAPD) = 25 cm² and ar (ΔBPC) = 15 cm². Calculate :
(i) ar (∥ gm ABCD)
(ii) DP : PC

In the adjoining figure, ABCD is a parallelogram. P is a point on BC such that BP : PC = 1 : 2. DP produced meets AB produced at Q. Given ar (ΔCPQ) = 20 cm². Calculate :
(i) ar (ΔCDP)
(ii) ar (∥ gm ABCD)

In the given figure, squares ABDE and AFGC are drawn on the side AB and hypotenuse AC of right triangle ABC and BH ⟂ FG. Prove that :
(i) ∠EAC = ∠BAF
(ii) ar (sq. ABDE) = ar (rect. ARHF)