Question 10
In figure, P is the mid-point of side BC of a parallelogram ABCD such that ∠BAP=∠DAP. Prove that AD = 2CD .
Thinking process
Firstly, use the property that sum of cointeritor angles is 180∘.Secondly use the property that sum of all angles in a triangle Is 180∘ and then prove the required result.
In figure, P is the mid-point of side BC of a parallelogram ABCD such that ∠BAP=∠DAP. Prove that AD = 2CD .
Thinking process
Firstly, use the property that sum of cointeritor angles is 180∘.Secondly use the property that sum of all angles in a triangle Is 180∘ and then prove the required result.
Given in parallelogram ABCD, P is a mid-point of BC such that ∠BAP=∠DAP
To prove AD = 2CD
Proof Since, ABCD is a parallelogram.
So, AD ∥ BC and AB is transversal, then
∠A+∠B=180∘ [ Sum of cointerior angles is 180∘]
⇒∠B=180∘−∠A
In ΔABP, ∠PAB+∠B+∠BPA=180∘ [by angle sum property of a triangle]
⇒12∠A+180∘−∠A+∠BPA=180∘ [ from eq.(i)]
⇒∠BPA−∠A2=0
⇒∠BPA=∠BAP
⇒AB=BP [ Opposite sides of equal angles are equal]
On Multiplying both sides by 2 we get
2AB = 2BP
⇒2AB=BC [Since P is the mid-point of BC]
⇒ [Since, ABCD is a parallelogram, then AB = CD and BC = AD]
Given in parallelogram ABCD, P is a mid-point of BC such that ∠BAP=∠DAP
To prove AD = 2CD
Proof Since, ABCD is a parallelogram.
So, AD ∥ BC and AB is transversal, then
∠A+∠B=180∘ [ Sum of cointerior angles is 180∘]
⇒∠B=180∘−∠A
In ΔABP, ∠PAB+∠B+∠BPA=180∘ [by angle sum property of a triangle]
⇒12∠A+180∘−∠A+∠BPA=180∘ [ from eq.(i)]
⇒∠BPA−∠A2=0
⇒∠BPA=∠BAP
⇒AB=BP [ Opposite sides of equal angles are equal]
On Multiplying both sides by 2 we get
2AB = 2BP
⇒2AB=BC [Since P is the mid-point of BC]
⇒ [Since, ABCD is a parallelogram, then AB = CD and BC = AD]
