The correct options are
A y+2=21±√5748(x+15)
B y−265=21±5√3324(x−95)
Circle 1: Centre C1(−1,4), radius=2
Circle 2: Centre C2(6,7), radius=3
Consider, |C1C2|=√58 and r1+r2=5⇒|C1C2|>r1+r2
∴4 common tangents exists:2TCTs and 2DCTs
Q divides the join of C1,C2 internally in the ratio r1:r2
∴C1Q:C2Q=2:3
⇒Q=(95,265)
Thus by point slope form
Equation of transverse common tangents passing through Q=(95,265) is:
⇒5mx−5y+26−9m=0
But this touches both the circle
⇒ pependicular distance=radius
⇒∣∣∣−5m+6−9m√25m2+25∣∣∣=2
Solving this we get,
m=21±5√3324
Hence equation of transverse common tangent T3,T4 are:
y−265=21±5√3324(x−95)
p divides the join of C1,C2 externally in the ratio r1:r2
∴PC1:PC2=2:3
⇒P=(−15,−2)
Equation of direct common tangents passing through P(−15,−2) is:
y+2=m(x+15)
⇒mx−y+15m−2=0
⇒ perpendicular distance = radius
⇒∣∣∣−m−4+15m−2√m2+1∣∣∣=2
Solving this,we get,
m=21±√5748
Hence equation of direct common tangents T1,T2 are:
y+2=21±√5748(x+15)