Let f1, f2 and f3 be three curves satisfying the differential equation (1-y2) d x=2 x y d y and pass through (0,2). If f3 cuts the curves f1 and f2 at A and B respectively and one of the curve is passing through C (5,-1), then find the area of triangle ABC.

Question

Let f1, f2 and f3 be three curves satisfying the differential equation (1-y2) d x=2 x y d y and pass through (0,2). If f3 cuts the curves f1 and f2 at A and B respectively and one of the curve is passing through C (5,-1), then find the area of triangle ABC. (A)  (B)  (C)  (D)

Tardigrade Admin · Accepted Answer

<img class="img-fluid question-image" alt="image" src="https://cdn.tardigrade.in/img/question/mathematics/fddd640a57d2471e25ba4e64740f194f-.png" /> Θ Given differential equation can be written as ∫ (d x/x)=∫ (2 y/1-y2) d y=∫ (2 y/y2-1) d y ⇒ ln x=- ln (y2-1)+ ln c ⇒ x(y2-1)=c Θ (0,2) text is on it ⇒ c=0 ∴ x(y2-1)=0 ⇒ x=0, y= ± 1 Area of triangle ABC =(1/2) × 2 × 5=5

Q. Let f1​,f2​ and f3​ be three curves satisfying the differential equation (1−y2)dx=2xydy and pass through (0,2). If f3​ cuts the curves f1​ and f2​ at A and B respectively and one of the curve is passing through C(5,−1), then find the area of △ABC.

Θ Given differential equation can be written as ∫xdx​=∫1−y22y​dy=∫y2−12y​dy ⇒lnx=−ln(y2−1)+lnc ⇒x(y2−1)=c Θ(0,2) is on it ⇒c=0 ∴x(y2−1)=0⇒x=0,y=±1 Area of △ABC=21​×2×5=5