There are exactly two distinct linear functions, which map [-1,1] onto [0,3]. Find the point of intersection of the two functions.

Find the integrals of the functions: 1/(sinxcos^3x)

Find the integrals of the function: (1-cosx)/(1+cosx)

Given f(x) =1/(x-1) . Find the points of discontinuity of the composite function f(f(x))

Find x and y if the point (x,-1,3), (3,y,1) and (-1,11,9) are collinear. Also, write down the vector equation of the line in which they lie. Further, find the point of intersection of this line and the plane x+y+z+1=0 .

If there are only two linear functions f and g which map [1,2] on [4,6] and in a DeltaABC, c =f (1)+g (1) and a is the maximum valur of r^(2), where r is the distance of a variable point on the curve x^(2)+y^(2)-xy=10 from the origin, then sin A: sin C is

The lines x+3y-1=0 and x-4y=0 intersect each other. Find their point of intersection.

Find the point of intersection of the straight lines : x/3-y/4=0, x/2+y/3 =1 .

How many points can be two distinct lines intersect at the most?

Does there exist a function which is continuous everywhere but not differentiable at exactly two points? Justify your answer.

Statement I Circles x^(2)+y^(2)=4andx^(2)+y^(2)-8x+7=0 intersect each other at two distinct points Statement II Circles with centres C_(1),C_(2) and radii r_(1),r_(2) intersect at two distinct points if |C_(1)C_(2)|ltr_(1)+r_(2)