[" (A) "3],[" Tangent to the curve "y=x^(2)+6" at the point "P(1,7)" touches the circle "x^(2)+y^(2)+16x+12y" ,"],[[" (A) "(-6,-11)," (B) "(-9,-13)," (C) "(-10,-15)]]

Tangent to the curve y=x^(2)+6 at the point P(1,7) touches the circle x^(2)+y^(2)+16x+12y+c=0 at a point Q. Show that Q=(-6,-7)

Tangent to the curve y=x^(2)+6 at a point (1,7) touches the circle x^(2)+y^(2)+16x+12y+c=0 at a point Q, then the coordinates of Q are (A)(-6,-11) (B) (-9,-13)(C)(-10,-15)(D)(-6,-7)

Tangent to the curve y=x^2+6 at a point (1,7) touches the circle x^2+y^2+16x+12y+c=0 at a point Q , then the coordinates of Q are (A) (-6,-11) (B) (-9,-13) (C) (-10,-15) (D) (-6,-7)

Tangent to the curve y=x^2+6 at a point (1,7) touches the circle x^2+y^2+16x+12y+c=0 at a point Q , then the coordinates of Q are (A) (-6,-11) (B) (-9,-13) (C) (-10,-15) (D) (-6,-7)

Tangent to the curve y=x^2+6 at a point (1,7) touches the circle x^2+y^2+16x+12y+c=0 at a point Q , then the coordinates of Q are (A) (-6,-11) (B) (-9,-13) (C) (-10,-15) (D) (-6,-7)

Tangent to the curve y=x^2+6 at a point (1,7) touches the circle x^2+y^2+16x+12y+c=0 at a point Q , then the coordinates of Q are (A) (-6,-11) (B) (-9,-13) (C) (-10,-15) (D) (-6,-7)

If tangent to the curve x^(2) = y - 6 at point (1,7) touches the circle x^(2) + y^(2) + 16x + 12y + c = 0 then value of c is ………

A tangent is drawn to the parabola y=x^(2)+6 at the point (1,7) which also touches the circle x^(2)+ty^(2)+16x+12y+c=0 at