From the point A (0,3) on the circle x2 + 4x+ ( y - 3)2 = 0, a chord AB is drawn and extended to a point M such that AM = 2 AB. The equation of the locus of M is....

Question

From the point A (0,3) on the circle x2 + 4x+ ( y - 3)2 = 0, a chord AB is drawn and extended to a point M such that AM = 2 AB. The equation of the locus of M is.... (A)  (B)  (C)  (D)

Tardigrade Admin · Accepted Answer

Given, (x + 2)2 + (y - 3)2 = 4 Let the coordinate be M (h , k), where B is mid-point of A and M. ⇒ B Bigg((h/2),(k+3/3) Bigg) But AB is the chord of circle x2 + 4x + (y - 3)2 = 0 Thus, B must satisfy above equation. ∴ (h2/4)+(4h/2)+ Bigg[(1/2)(k+3)-3 Bigg]2=0 ⇒ h2 + y2 + 8x - 6y + 9 = 0 ∴ Locus of M is the circle x2 + y2 + 8x - 6y + 9 = 0

Q. From the point A(0,3) on the circle x2+4x+(y−3)2=0, a chord AB is drawn and extended to a point M such that AM=2AB. The equation of the locus of M is....

Given, (x+2)2+(y−3)2=4 Let the coordinate be M(h,k), where B is mid-point of A and M. ⇒B(2h​,3k+3​) But AB is the chord of circle x2+4x+(y−3)2=0 Thus, B must satisfy above equation. ∴4h2​+24h​+[21​(k+3)−3]2=0 ⇒h2+y2+8x−6y+9=0 ∴ Locus of M is the circle x2+y2+8x−6y+9=0

Q. From the point $A (0, 3)$ on the circle $x^{2} + 4 x + (y - 3)^{2} = 0,$ a chord $A B$ is drawn and extended to a point $M$ such that $A M = 2 A B$ . The equation of the locus of $M$ is....