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))`.

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

The equation of the tangent to the curve y=e^(-|x|) at the point where the curve cuts the line x = 1, is

Find value of c such that line joining the points (0, 3) and (5, -2) becomes tangent to curve y=c/(x+1)

When the tangent the curve y=x log (x) is parallel to the chord joining the points (1,0) and (e,e) the value of x , is

If the curves y=2\ e^x and y=a e^(-x) intersect orthogonally, then a= (a)1//2 (b) -1//2 (c) 2 (d) 2e^2

The curve given by x+y=e^(x y) has a tangent parallel to the y-axis at the point (a) (0,1) (b) (1,0) (c) (1,1) (d) none of these

The curve given by x+y=e^(x y) has a tangent parallel to the y - axis at the point (0,1) (b) (1,0) (c) (1,1) (d) none of these

If the lines joining the points of intersection of the curve 4x^2+9y+18 x y=1 and the line y=2x+c to the origin are equally inclined to the y-axis, the c is: -1 (b) 1/3 (c) 2/3 (d) -1/2

If the lines joining the points of intersection of the curve 4x^2+9y+18 x y=1 and the line y=2x+c to the origin are equally inclined to the y-axis, the c is: -1 (b) 1/3 (c) 2/3 (d) -1/2

Consider two curves C1:y^2=4x ; C2=x^2+y^2-6x+1=0 . Then, a. C1 and C2 touch each other at one point b. C1 and C2 touch each other exactly at two point c. C1 and C2 intersect(but do not touch) at exactly two point d. C1 and C2 neither intersect nor touch each other