If A `gt` 0, c,d,u.v are non-zero constants and the graph of `f(x)=abs(Ax+c)+d " and " g(x)=-abs(Ax+u)+v` intersect exactly at two points (1,4) and (3,1), then the value of `(u+c)/(A)` equals

If the graphs of the functions y= log _(e)x and y = ax intersect at exactly two points,then find the value of a .

Prove that the points A(0,1), B(1,4), C(4,3) and D(3,0) are the vertices of a square ABCD.

Let for a != a_1 != 0 , f(x)=ax^2+bx+c , g(x)=a_1x^2+b_1x+c_1 and p(x) = f(x) - g(x) . If p(x) = 0 only for x = -1 and p(-2) = 2 then the value of p(2) .

Let f(x)=x+2|x+1|+2|x-1| .If f(x)=k has exactly one real solution, then the value of k is (a) 3 (b)0 (c) 1 (d) 2

Let f(x)=abs(x-1)+abs(x-2)+abs(x-3)+abs(x-4), then least value of f(x) is

Let A(6, -1), B (1, 3) and C (x, 8) be three points such that AB = BC then the value of x are

Given f' (1) = 1 and d/(dx)f(2x)=f'(x) AA x > 0 . If f' (x) is differentiable then there exists a number c in (2,4) such that f'' (c) equals

Find a, b, c, and d, where f(x)=(ax+b)cosx+(cx+d)sinxandf'(x)=xcosx is identity in x.

The tangent to the curve y=e^(x) drawn at the point (c,e^(c)) intersects the line joining the points (c-1,e^(c-1)) and (c+1,e^(c+1)) (a)one the left of x = c (b)on the right of x = c (c)at no point (d) at all points

If 0 and 1 are the zeroes of the polynomial f (x) = 2x ^(3) - 3x ^(2) + ax +b, then find the values of a and b.