the lines `(p+2q)x+(p-3q)y=p-q` for different values of `p&q` passes trough the fixed point is:

The lines (p+2q)x+(p-3q)y=p-q for different values of p and q passes through the fixed point

The line (p+2q)x+(p-3q)y=p-q for different values of p and q passes through the point

T P and T Q are tangents to the parabola y^2=4a x at P and Q , respectively. If the chord P Q passes through the fixed point (-a ,b), then find the locus of Tdot

If the normals at P and Q meet again on the parabola y^(2) =4ax then the chord joining P and Q passes thorugh a fixed point

If 3a+2b+c=0 the family of straight lines ax+by+c=0 passes through the fixed point (p, q) then p + q

if 2^(p)+3^(q)=17 and 2^(p+2)-3^(q+1)=5 then find the value of p&q