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 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

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 ____________.

When the tangent to the curve y=xlogx is parallel to the chord joining the points (1, 0) and (e ,\ e) , the value of x is e^(1//1-e) (b) e^((e-1)(2e-1)) (c) e^((2e-1)/(e-1)) (d) (e-1)/e

(a) Find the slope of the tangent to the cube parabola y = x^(3) at the point x=sqrt(3)/(3) (b) Write the equations of the tangents to the curve y = (1)/(1+x^(2)) at the 1 points of its intersection with the hyperbola y = (1)/(x+1) (c) Write the equation of the normal to the parabola y = x^(2) + 4x + 1 perpendicular to the line joining the origin of coordinates with the vertex of the parabola. (d) At what angle does the curve y = e^(x) intersect the y-axis

The equation of the tangent to the curve y=1-e^(x//2) at the tangent to the curve y=1-e^(x//2) at the point of intersection with the y-axis, is

Find an equation of the tangent line to the curve y=e^(x)//(1+x^(2)) at the point (1,e//2)

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

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