Let A(-1, 1), B(3, 4) and C(2,0) be given three points. A line `y=mx,mgt0`, intersects lines AC and BC at point P and Q respectively. Let `A_(1)` and `A_(2)` be the areas of `DeltaABC` and `DeltaPQC` respectively, such that `A_(1)=3A_(2)`, then the value of m is equal to :

Consider 3 points A(-1,1) , B(3,4) and C(2,0) . The line y=mx+c cuts line AC and BC at points P and Q res. If the area of DeltaABC=A_1 and area of DeltaPQC=A_2 and A_1=3A_2 then positive value of m is

The spectrum of a black body at two temperatures 27^(@)C and 327^(@)C is shown in the figure. Let A_(1) and A_(2) be the areas under the two curves respectively. Find the value of (A_(2))/(A_(1))

If a_(1),a_(2),a_(3) are the last three digits of 17^(256) respectively then the value of a_(2)-a_(1)-a_(3) is equal

Let a and b be two positive real numbers such that a+2b<=1. Let A_(1) and A_(2) be, respectively,the areas of circles with radii ab^(3) and b^(2). Then the maximum possible value of (A_(1))/(A_(2)) is:

A_(1), A_(2) are two arithmetic means between two positive real numbers a and b. P is the point of intersection of the perpendicular lines 2x+y-20=0 and x-2y+10=0 . If the centroid of the triangle with vertices (a, b), (A_(1), A_(2)) and (A_(2), A_(1)) lies at the point P, the value of ab is equal to

The line L_(1)-=3x-4y+1=0 touches the circles C_(1) and C_(2) . Centers of C_(1) and C_(2) are A_(1)(1, 2) and A_(2)(3, 1) respectively Then, the length (in units) of the transverse common tangent of C_(1) and C_(2) is equal to

n equidistant points A_(1), A_(2), A_(3) ………A_(n) are taken on base BC of DeltaABC is A_(1)B=A_(1)A_(2)=A_(n)C and area of DeltaA""A_(4)A_(5) is k cm^(2) , then what is the area of DeltaABC .

Let points A_(1), A_(2) and A_(3) lie on the parabola y^(2)=8x. If triangle A_(1)A_(2)A_(3) is an equilateral triangle and normals at points A_(1), A_(2) and A_(3) on this parabola meet at the point (h, 0). Then the value of h I s

Let the straight line y=k divide the area enclosed by x=(1-y)^(2) , x=0 and y=0 into two parts of areas, A_(1)(0 <= y <= k) and A_(2)(k <= y <= 1) such that (A_(1))/(A_(2))=7. Then (1)/(k) is equal to

The corresponding medians of two similar triangles are in the ratio 4 : 7 . Let their respective areas be A_(1) and A_(2)*A_(1) : A_(2)= …… .