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 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 x=c (b) on the right of x=c (c) at no points (d) at all points

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 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

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)) .

about to only mathematics 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) )

If the tangent to the curve , y =f (x)= x log_(e)x, ( x gt 0) at a point (c, f(c)) is parallel to the line - segment joining the point (1,0) and (e,e) then c is equal to :

If the tangent to the curve y= e^x at a point (c, e^c) and the normal to the parabola, y^2 = 4x at the point (1,2) intersect at the same point on the x-axis then the value of c is ____________.

The line joining the points (0,3) and (5,-2) becomes tangent to the curve y=c/(x+1) then c=