A tangent having slope `(-4)/(3)` to the ellipse `(x^(2))/(18)+(y^(2))/(32)=1` intersects the major and minor axes at A and B .If o is origin,then the area of ,`Delta OAB` is k sq.units where sum of digits of k is

A tangent having slope of -(4)/(3) to the ellipse (x^(2))/(18)+(y^(2))/(32)=1 intersects the major and minor axes at points A and B, respectively.If C is the center of the ellipse,then find area of triangle ABC.

If a tangent having a slope of -4/3 to the ellipse x^2/18 + y^2/32 = 1 intersects the major and minor axes in points A and B respectively, then the area of DeltaOAB is equal to (A) 12 sq. untis (B) 24 sq. units (C) 48 sq. units (D) 64 sq. units

A tangent having slope of -4/3 to the ellipse (x^2)/(18)+(y^2)/(32)=1 intersects the major and minor axes at point Aa n dB , respectively. If C is the center of the ellipse, then the area of triangle A B C is 12s qdotu n i t s (b) 24s qdotu n i t s 36s qdotu n i t s (d) 48s qdotu n i t s

Distance between the parallel tangents having slope -(4)/(3) to the ellipse (x^(2))/(18)+(y^(2))/(32) = 1 , is

A tangent having slope of -(4)/(3) to ellipse (x^(2))/(a^(2))+(y^(2))/(b^(2))=1 Intersect the major and minor axis at point A and B( on positive axes) respectively then distance of fine AB from the centroid of triangle OAB, where is the origin, is

If the tangent at a point on the ellipse (x^(2))/(27)+(y^(2))/(3)=1 meets the coordinate axes at A and B, and the origin,then the minimum area (in sq.units) of the triangle OAB is:

Tangent to the ellipse (x^(2))/(32)+(y^(2))/(18)=1 having slope -(3)/(4) meet the coordinates axes in A and B. Find the area of the DeltaAOB , where O is the origin .

Tangent at a point on the ellipse (x^(2))/(a^(2))+(y^(2))/(b^(2))=1 is drawn which cuts the coordinates axes at A and B the maximum area of the triangle OAB is ( O being origin )