A line is drawn from A(-2,0) to intersect the curve `y^2 = 4x` in P and Q in the first quadrant such that `1/(AP) + 1/ (AQ) < 1/4`, then slope of the line always be :

A line is drawn form A(-2,0) to intersect the curve y^(2)=4x at P and Q in the first quadrant such that (1)/(AP)+(1)/(AQ) sqrt(3)(B) sqrt(2)(D)>(1)/(sqrt(3))

A line is drawn from A(-2,0) to intersect the curve y^2=4x at P and Q in the first quadrent such that 1/(AP)+1/(AQ)lt1/4 . Then the slope of the line is always

A line is drawn form A(-2,0) to intersect the curve y^2=4x at P and Q in the first quadrant such that 1/(A P)+1/(A Q) lt 1/4 Then the slope of the line is always. (A) gt sqrt(3) (B) lt 1/(sqrt(3)) (C) gt sqrt(2) (D) gt 1/(sqrt(3))

A line is drawn form A(-2,0) to intersect the curve y^2=4x at P and Q in the first quadrant such that 1/(A P)+1/(A Q) lt 1/4 Then the slope of the line is always. (A) gt sqrt(3) (B) lt 1/(sqrt(3)) (C) gt sqrt(2) (D) gt 1/(sqrt(3))

A line is drawn form A(-2,0) to intersect the curve y^2=4x at Pa n dQ in the first quadrant such that 1/(A P)+1/(A Q) sqrt(3) (b) sqrt(2) (d) >1/(sqrt(3))

A line ax +by +c = 0 through the point A(-2,0) intersects the curve y^(2)=4a in P and Q such that (1)/(AP) +(1)/(AQ) =(1)/(4) (P,Q are in 1st quadrant). The value of sqrt(a^(2)+b^(2)+c^(2)) is

A line ax +by +c = 0 through the point A(-2,0) intersects the curve y^(2)=4a in P and Q such that (1)/(AP) +(1)/(AQ) =(1)/(4) (P,Q are in 1st quadrant). The value of sqrt(a^(2)+b^(2)+c^(2)) is

A line ax +by +c = 0 through the point A(-2,0) intersects the curve y^(2)=4a in P and Q such that (1)/(AP) +(1)/(AQ) =(1)/(4) (P,Q are in 1st quadrant). The value of sqrt(a^(2)+b^(2)+c^(2)) is

The area bounded by the curve y^(2)=9x and the lines x=1,x=4 and y=0, in the first quadrant,is