A B C D is a parallelogram and P is a point on the segment AD dividing it internally in the ratio 3: 1. If the line BP meets the diagonal A C in Q, then A Q: Q C equals

Question

A B C D is a parallelogram and P is a point on the segment AD dividing it internally in the ratio 3: 1. If the line BP meets the diagonal A C in Q, then A Q: Q C equals (A) 3: 4 (B) 4: 3 (C) 3: 2 (D) 2: 3

Tardigrade Admin · Accepted Answer

Since, P divides A D in the ratio 3: 1, so P will be (3 d /4) <img class="img-fluid question-image" alt="image" src="https://cdn.tardigrade.in/img/question/mathematics/63614ee09cd578a27aff8d6e616f4695-.png" /> Let Q divides B P in 1: λ and A C in 1: μ. ∴ ( b + d /1+μ)=((3 d /4)+λ b /1+λ) ⇒ b (1+λ)+(1+λ) d =(3/4)(1+μ) d +λ(1+μ) d On equating the vectors b and d, we get 1+λ=(3/4)(1+μ) and 1+λ=λ(1+μ) ⇒ λ =(3/4) text and μ=(4/3) ∴ A Q: Q C =1: μ =1: (4/3)=3: 4

Q. $A B C D$ is a parallelogram and $P$ is a point on the segment $A D$ dividing it internally in the ratio $3 : 1$ . If the line $BP$ meets the diagonal $A C$ in $Q$ , then $A Q : QC$ equals

3 : 4

4 : 3

3 : 2

2 : 3

Q. ABCD is a parallelogram and P is a point on the segment AD dividing it internally in the ratio 3:1. If the line BP meets the diagonal AC in Q, then AQ:QC equals

3 : 4

4 : 3

3 : 2

2 : 3

Since, P divides AD in the ratio 3:1, so P will be 43d​ Let Q divides BP in 1:λ and AC in 1:μ. ∴1+μb+d​=1+λ43d​+λb​ ⇒b(1+λ)+(1+λ)d=43​(1+μ)d+λ(1+μ)d On equating the vectors b and d, we get 1+λ=43​(1+μ) and 1+λ=λ(1+μ) ⇒λ=43​ and μ=34​ ∴AQ:QC=1:μ =1:34​=3:4

Q. $A B C D$ is a parallelogram and $P$ is a point on the segment $A D$ dividing it internally in the ratio $3 : 1$ . If the line $BP$ meets the diagonal $A C$ in $Q$ , then $A Q : QC$ equals